The velocity reached by the soccer player is 2.7 m/s.
Impulse applied by the soccer player = 200 Ns
Mass of the soccer player = 74 kg
According to impulse-momentum theorem, the average net external force multiplied by the time it takes for that force to take effect equals the impulse, which is equal to the change in momentum.
Impulse = Fnet × t
Fnet x t = ma × t = m × v
mv = ΔP
where ΔP is the change in momentum.
So,
The change in momentum of the player, ΔP = 200 Kgm/s
So, velocity reached, v = 200/74
v = 2.7 m/s
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A thin uniform rod has a length of 0.480 m and is rotating in a circle on a frictionless table. The axis of rotation is perpendicular to the length of the rod at one end and is stationary. The rod has an angular velocity of 0.37 rad/s and a moment of inertia about the axis of 3.10×10−3 kg⋅m2. A bug initially standing on the rod at the axis of rotation decides to crawl out to the other end of the rod. When the bug has reached the end of the rod and sits there, its tangential speed is 0.132 m/s. The bug can be treated as a point mass.
(a) What is the mass of the rod?
(b) What is the mass of the bug?
(a) To solve for the mass of the rod, we can use the formula for rotational kinetic energy:
KE = (1/2) * I * w^2
where KE is the rotational kinetic energy, I is the moment of inertia, and w is the angular velocity.
At the beginning, when the bug is at the axis of rotation, the rotational kinetic energy of the rod is:
KE1 = (1/2) * I * w^2 = (1/2) * (3.10×10−3 kg⋅m^2) * (0.37 rad/s)^2 = 0.036 J
When the bug reaches the other end of the rod, the rotational kinetic energy is:
KE2 = (1/2) * I * w^2 = (1/2) * (3.10×10−3 kg⋅m^2) * (0.132 m/s)^2 / (0.480 m)^2 = 3.62×10^-5 J
The change in kinetic energy is due to the work done by the bug as it crawls along the rod. The work done by the bug can be calculated as the product of the force it exerts on the rod and the distance it crawls:
W = F * d
The force the bug exerts on the rod can be calculated using Newton's second law for rotational motion:
τ = I * α
where τ is the torque, α is the angular acceleration, and I is the moment of inertia.
Since the rod is rotating with a constant angular velocity, its angular acceleration is zero, so the net torque on the rod must be zero. This means that the torque exerted by the bug on the rod must be equal and opposite to the torque due to the angular momentum of the rod:
τ_bug = τ_rod
F * d = I * w
F = I * w / d
Substituting the values given, we get:
F = (3.10×10−3 kg⋅m^2) * (0.37 rad/s) / (0.480 m) = 0.0237 N
Now we can use the work-energy principle to find the mass of the rod:
W = KE2 - KE1 = F * d = (1/2) * m * v^2
where m is the mass of the rod and v is the tangential velocity of the bug at the end of the rod.
Substituting the values given, we get:
(1/2) * m * (0.132 m/s)^2 = 3.62×10^-5 J - 0.036 J
Simplifying and solving for m, we get:
m = 0.221 kg
Therefore, the mass of the rod is 0.221 kg.
(b) To find the mass of the bug, we can use the same equation we used to calculate the force it exerted on the rod:
F = I * α / d
where α is the angular acceleration of the rod caused by the bug crawling along it.
Since the rod is a thin uniform rod, its moment of inertia can be calculated as:
I = (1/3) * m * L^2
where L is the length of the rod.
Substituting the values given, we get:
I = (1/3) * (0.221 kg) * (0.480 m)^2 = 0.0202 kg⋅m^2
Now we can calculate the angular acceleration caused by the bug crawling along the rod. Since the rod is rotating with a constant angular velocity, its angular acceleration is given by:
α
Fade
finish
α = (w_f^2 - w_i^2) / (2 * θ)
where w_i is the initial angular velocity of the rod, w_f is the final angular velocity of the rod after the bug has crawled to the end, and θ is the angle through which the bug crawls, which is equal to the length of the rod:
θ = L = 0.480 m
Substituting the values given, we get:
α = (0.132 m/s)^2 / (2 * 0.480 m) = 0.072 rad/s^2
Now we can calculate the force exerted by the bug on the rod:
F = I * α / d = (0.0202 kg⋅m^2) * (0.072 rad/s^2) / (0.480 m) = 0.00303 N
Finally, we can use Newton's second law to find the mass of the bug:
F = m * a
where a is the tangential acceleration of the bug, given by:
a = r * α
where r is the distance from the bug to the axis of rotation, which is equal to the length of the rod minus the distance the bug has crawled, or:
r = L - d = 0.480 m - 0.480 m = 0 m
Therefore, the tangential acceleration of the bug is zero, and its mass is:
m = F / a = 0.00303 N / 0 m/s^2 = undefined
This means that the force exerted by the bug on the rod is not enough to cause any tangential acceleration, and therefore the mass of the bug is negligible compared to the mass of the rod. We can assume that the bug has zero mass for practical purposes.
answer only the yellow dish,. ignore the writing it is a blank space. please I need explanation how to do it. only you fill the yellow dish.
please help
The orbital period of an exoplanet using a light curve is calculated using the length of time between each dip in the light curve, represented by a line that drops below the normal light intensity.
How to solvePlanet | Mass of parent star (relative to sun) | Orbital Period (days) | Distance from parent star (AU) | Distance from parent star (km)
Kepler-5b | 1.37 Ms | 3.55 | 0.05064 | 7,580,000
Kepler-6b | 1.21 Ms | 3.23 | 0.04559 | 6,820,000
Kepler-7b | 1.36 Ms | 4.89 | 0.06250 | 9,350,000
Kepler-8b | 1.21 Ms | 3.52 | 0.04828 | 7,220,000
Kepler-9b | 1.04 Ms | 384.84 | 1.046 | 156,500,000
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Given vectors A → = 2.0 x ^ − 3.2 y ^ and B → = − 1.2 x ^ + 2.9 y ^ what is the angle between the vector D → = A → − B → and the positive x-axis?
Okay, let's solve this step-by-step:
1) Given:
A → = 2.0 x ^ − 3.2 y ^
B → = − 1.2 x ^ + 2.9 y ^
Find: Angle between D → = A → − B → and positive x-axis
2) Subtract the vectors to find D →:
D → = 2.0 x ^ − 3.2 y ^ - (− 1.2 x ^ + 2.9 y ^ )
= 2.0 x ^ − 3.2 y ^ + 1.2 x ^ - 2.9 y ^
= 3.2 x ^ − 6.1 y ^
3) To find the angle, we use the inverse tangent ratio of y/x:
Angle = tan−1(−6.1/3.2) = -61.97°
4) Since the angle is in the 4th quadrant, it is measured clockwise from the positive x-axis. So the final angle is 180 - 61.97 = 118.03°
Therefore, the angle between the vector D → = A → − B → and the positive x-axis is 118.03°.
Let me know if you have any other questions!
A bungee cord is essentially a very long rubber band that can stretch up to four times its unstretched length. However, its spring constant varies over its stretch. Take the length of the cord to be along the x-direction and define the stretch x as the length of the cord l minus its un-stretched length [tex]l_0[/tex]; that is, [tex]x=l-l_0[/tex] (see below). Suppose a particular bungee cord has a spring constant, for 0 ≤ x ≤ 4.88m , of [tex]k_1=204 N/m[/tex] and for x ≥ 4.88m , of [tex]k_2=111N/m[/tex]. (Recall that the spring constant is the slope of the force F(x) versus its stretch x.) (a) What is the tension in the cord when the stretch is 16.7 m (the maximum desired for a given jump)? (b) How much work must be done against the elastic force of the bungee cord to stretch it 16.7 m? please explain if possible!
Answer:
(a) To find the tension in the cord when the stretch is 16.7 m, we need to first determine which spring constant applies to this stretch. Since 16.7 m is greater than 4.88 m, the spring constant for x ≥ 4.88 m applies, which is
�
2
=
111
�
/
�
k
2
=111N/m.
Next, we need to find the force exerted by the bungee cord at this stretch. The force F(x) exerted by a spring is given by:
F(x) = kx
where k is the spring constant and x is the stretch. Plugging in the values for k and x, we get:
F(16.7) = (111 N/m)(16.7 m) = 1853.7 N
Therefore, the tension in the cord when the stretch is 16.7 m is 1853.7 N.
(b) To find the work done against the elastic force of the bungee cord to stretch it 16.7 m, we need to integrate the force over the stretch. Since the spring constant changes at 4.88 m, we need to break up the integration into two parts.
For 0 ≤ x ≤ 4.88 m, the force is given by:
F(x) = k
1
x
where k
1
= 204 N/m. Integrating this expression over the stretch from 0 to 4.88 m, we get:
W
1
= ∫
4.88
0
k
1
x dx = (204 N/m) * (4.88 m)
2
/ 2 = 996.8 J
For 4.88 m ≤ x ≤ 16.7 m, the force is given by:
F(x) = k
2
x
where k
2
= 111 N/m. Integrating this expression over the stretch from 4.88 m to 16.7 m, we get:
W
2
= ∫
16.7
4.88
k
2
x dx = (111 N/m) * (16.7 m)
2
/ 2 - (111 N/m) * (4.88 m)
2
/ 2 = 1232.8 J
Therefore, the total work done against the elastic force of the bungee cord to stretch it 16.7 m is:
W = W
1
+ W
2
= 996.8 J + 1232.8 J = 2229.6 J
The _________ is deep inside the star but not hot enough to produce fusion. Heat is carried through it by radiation.
A. Convective zone
B. Core
C. Radiative zone
D. Corona
The radiative zone is deep inside the star but not hot enough to produce fusion. Heat is carried through it by radiation. Thus, option C is correct.
A stellar core is a dense and extremely hot region in the center of the star. In the region of the core, temperature, and pressure is responsible for the nuclear fusion takes place. The next inner layer is a radiative zone which is present outside of the core. The light emitted by nuclear fusion travels out to the next layer of the zone called a radiative zone.
The convection zone is made up of plasma and in the convective zone, the convection process takes place. The convective zone is unstable as the flux of matter travels from the hottest region to the coldest region. The corona forms the outermost layer of the star where fusion is not taking place.
Thus, the correct option is C) Radiative zone.
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Assuming an energy-generation efficiency (i.e., the ratio of energy released to total mass-energy available) of 11 percent, calculate how much mass a 3.0×1041 W
quasar would consume if it shone for 50 billion years.
To solve this problem, we need to use Einstein's famous equation, E=mc^2, which relates energy and mass. Mass is a E= mc2 answer is 4.86×10^54 kg.
What is a consumer ?Consumers are an important part of food chains and food webs in ecosystems, as they help to transfer energy and nutrients between different levels of the food chain. Without consumers, the energy stored in plants and other producers would not be available to other organisms in the ecosystem, which could have significant impacts on the overall health and functioning of the ecosystem.
What is an ecosystem ?An ecosystem refers to a community of living organisms and their physical environment interacting as a system. It can be a small area, such as a pond or a forest, or a larger area, such as a desert or an ocean.
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A block of mass M on a horizontal surface is connected to the end of a massless spring of spring
constant k . The block is pulled a distance x from equilibrium and when released from rest, the
block moves toward equilibrium. What coefficient of kinetic friction between the surface and the
block would allow the block to return to equilibrium and stop?
The coefficient of kinetic friction that would allow the block to return to equilibrium and stop is given by (kx)/mg.
What coefficient of kinetic friction?
Let's analyze the motion of the block in order to determine the coefficient of kinetic friction that would allow the block to return to equilibrium and stop.
First, let's consider the forces acting on the block when it is pulled from equilibrium and released. Initially, when the block is pulled a distance x from equilibrium, the only force acting on it is the force exerted by the spring, which is given by Hooke's Law:
F_spring = -kx
where;
k is the spring constant and x is the displacement of the block from its equilibrium position.When the block is released, it will experience an acceleration due to the force exerted by the spring. As it moves towards equilibrium, the spring force will decrease until it becomes zero when the block reaches the equilibrium position. At this point, the only force acting on the block will be the kinetic friction force, which opposes the motion of the block.
The equation of motion for the block can be given by Newton's second law:
F_net = ma
where;
F_net is the net force acting on the block, m is the mass of the block, and a is its acceleration.Since the only force acting on the block is the kinetic friction force when it reaches equilibrium, we can equate the net force with the kinetic friction force:
F_friction = ma
where;
F_friction is the kinetic friction force.Now, let's express the kinetic friction force in terms of the coefficient of kinetic friction μ_k and the normal force N. The normal force is the force exerted by the surface on the block and is equal in magnitude to the weight of the block, which is given by:
N = mg
where;
g is the acceleration due to gravity.The kinetic friction force can be expressed as:
F_friction = μ_kN
Substituting the expression for N, we get:
F_friction = μ_kmg
Now, equating this with ma, we have:
μ_kmg = ma
Canceling the mass from both sides, we get:
μ_kg = a
Now, we can substitute the expression for acceleration a with the acceleration due to the spring force using Hooke's Law:
μ_kg = (kx)/m
Finally, solving for the coefficient of kinetic friction μ_k, we get:
μ_k = (kx)/mg
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1. A rich merchant finds himself stranded in the middle of a frozen lake. Don't ask how he got there. Think Twilight Zone... The surface
is perfectly frictionless. All he has is his clothing and a large bag of gold coins. How can he save himself? Write down your answer.
2. You are hammering a nail into a hard piece of wood. You are using one of your little brothers light, toy hammers and getting nowhere fast. Finally, you grab a hammer with a heavier head and your task goes much easier. Which one of Newtons laws did you finally remember? explain.
The rich merchant can save himself by throwing some gold coins in one direction.
You finally remembered Newton's second law of motion, which states that the acceleration of an object is directly proportional to the net force applied to it and inversely proportional to its mass.
How to understand Newton's laws?Newton's third rule of motion states that for every action, there is an equal and opposite reaction. When he tosses the gold coins in one direction, the flung coins cause a rebound force in the opposing direction. This recoil force will provide him with a little amount of velocity, which he may then employ to go in the opposite direction he tossed the coins. He can slowly make his way to the coast by continuing this method.
It is because the heavier hammer has more mass than the toy hammer, when the same force is applied to both hammers, the heavier hammer suffers less acceleration than the lighter hammer. This implies that the heavier hammer applies more power to the nail, making it easier to drive into the hard wood.
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A can (355 mL) of Coke has 140 "food calories" (1 food calorie = 1 kcal). How many equivalently sized cans worth of water could be brought to a boil using the energy in a single Coke? Assume the water is initially at room temperature (20°C). The density of water is 1000 kg/m3.
The number of cans would be approximately 5 cans
How to solve for the energyThe energy required to bring a certain amount of water to a boil can be calculated using the specific heat capacity of water, which is 4.184 J/g°C. The energy required to raise the temperature of one gram of water by one degree Celsius is 4.184 J.
To find out how many cans of water could be brought to a boil using the energy in one can of Coke, we need to calculate the total energy in one can of Coke, and then divide that by the energy required to bring one can of water to a boil.
First, let's convert the volume of the can from milliliters to liters:
355 mL = 0.355 L
The mass of the Coke in the can can be found using its density, which is approximately 1 g/mL:
mass = volume x density = 0.355 L x 1 g/mL = 0.355 kg
The energy in the can of Coke can be calculated using the number of food calories it contains:
energy = 140 food calories x 1000 cal/kcal x 4.184 J/cal = 585,760 J
To find out how many cans of water could be brought to a boil using this energy, we need to calculate the energy required to bring one can of water to a boil:
energy required = mass x specific heat capacity x temperature change
For one can of water, the mass is:
mass = volume x density = 0.355 L x 1000 g/L = 355 g
The temperature change required to bring the water to a boil from room temperature (20°C) is:
temperature change = boiling point of water - room temperature = 100°C - 20°C = 80°C
Therefore, the energy required to bring one can of water to a boil is:
energy required = 355 g x 4.184 J/g°C x 80°C = 118,782 J
Finally, we can find out how many cans of water could be brought to a boil using the energy in one can of Coke:
number of cans of water = energy in Coke / energy required per can of water
number of cans of water = 585,760 J / 118,782 J = 4.93
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A car travels at a speed of 30m/s when it leaves a ramp set at an angle fo 37 degrees from the ground. How high off the ground will the car reach? What is the maximum height of the gorge could the car clear?
We can use the laws of physics to solve this problem. The key here is to recognize that the initial kinetic energy of the car (due to its speed) is converted into potential energy as it goes up the ramp, and then back into kinetic energy as it falls back down.
Using conservation of energy, we can set the initial kinetic energy equal to the final potential energy at the maximum height:
(1/2) * m * v^2 = m * g * h
where m is the mass of the car, v is its initial speed (30 m/s), g is the acceleration due to gravity (9.81 m/s^2), and h is the maximum height.
Simplifying the equation and solving for h, we get:
h = (v^2 * sin^2(theta)) / (2 * g)
where theta is the angle of the ramp (37 degrees in this case).
Plugging in the known values, we get:
h = (30^2 * sin^2(37)) / (2 * 9.81) ≈ 79.1 meters
So the car will reach a height of approximately 79.1 meters off the ground.
To find the maximum height of the gorge that the car could clear, we need to look at the horizontal distance that the car travels while in the air. This distance is given by:
d = v * t
where t is the time that the car spends in the air. We can find t by setting the initial potential energy (at the maximum height) equal to the final kinetic energy (at the end of the jump):
m * g * h = (1/2) * m * (v_f^2)
where v_f is the final velocity of the car at the end of the jump (when it lands back on the ground). We can solve for v_f using:
v_f = sqrt(2gh)
where h is the maximum height (found earlier). Plugging this into the conservation of energy equation, we get:
t = sqrt(2h/g)
Now we can plug in the known values for v and theta to get:
d = 30 * sqrt(2h/g) * cos(theta)
Plugging in the values for h and theta, we get:
d = 30 * sqrt(2*79.1/9.81) * cos(37) ≈ 187.2 meters
So the maximum height of the gorge that the car could clear is approximately 187.2 meters.
An RLC series circuit has a 1.00 kn resistor, a 155 mH inductor, and a 25.0 nF capacitor.
(a) Find the circuit's impedance (in ) at 485 Hz.
(b) Find the circuit's impedante (in 2) at 7.50 kHz.
(c) If the voltage source has V
rms
=
___mA (at 485 Hz)
___mA (at 7.50 kHz)
(d) What is the resonant frequency (in kHz) of the circuit?
___kHz
408 V, what is Irms (in mA) at each frequency?
(e) What is Irms (in mA) at resonance?
___mA
(a) The impedance of the circuit at 485 Hz is approximately 1253.53 Ω.
(b) The impedance of the circuit at 7.50 kHz is approximately 1256.04 Ω.
(c) The current (Irms) at 485 Hz is approximately 326 mA, and the current at 7.50 kHz is approximately 325 mA.
(d) The resonant frequency of the circuit is approximately 25.74 kHz.
(e) The current (Irms) at resonance is approximately 408 mA.
What is the impedance of the circuit?a) The impedance (Z) of an RLC series circuit can be calculated using the formula:
Z = √(R^2 + (ωL - 1/ωC)^2)
where;
R is the resistance,L is the inductance, C is the capacitance, and ω is the angular frequency in radians per second.Given:
R = 1.00 kΩ = 1000 Ω
L = 155 mH = 0.155 H
C = 25.0 nF = 25.0 × 10^(-9) F
f = 485 Hz
First, we need to convert the frequency from Hz to radians per second:
ω = 2πf
Substituting the given values into the impedance formula:
Z = √((1000)^2 + ((2π × 485) × 0.155 - 1/(2π × 485 × 25.0 × 10^(-9)))^2)
Calculating Z:
Z = √((1000)^2 + (481.663)^2) ≈ 1253.53 Ω
(b) Given:
f = 7.50 kHz = 7500 Hz
ω = 2πf
Substituting the given values into the impedance formula:
Z = √((1000)^2 + ((2π × 7500) × 0.155 - 1/(2π × 7500 × 25.0 × 10^(-9)))^2)
Calculating Z:
Z = √((1000)^2 + (568.28)^2) ≈ 1256.04 Ω
So, the impedance of the circuit at 7.50 kHz is approximately 1256.04 Ω.
(c) Given:
Vrms = 408 V
At 485 Hz:
Irms = Vrms / Z (using the impedance calculated in part (a))
Irms = 408 / 1253.53 ≈ 0.326 A = 326 mA
At 7.50 kHz:
Irms = Vrms / Z (using the impedance calculated in part (b))
Irms = 408 / 1256.04 ≈ 0.325 A = 325 mA
(d) The resonant frequency of an RLC circuit can be calculated using the formula:
f_resonant = 1 / (2π√(LC))
Given:
L = 155 mH = 0.155 H
C = 25.0 nF = 25.0 × 10^(-9) F
Substituting the given values into the resonant frequency formula:
f_resonant = 1 / (2π√(0.155 × 25.0 × 10^(-9)))
Calculating f_resonant:
f_resonant ≈ 25.74 kHz
(e) At resonance, the impedance of the inductor (ωL) and the capacitor (1/(ωC)) cancel each other out, resulting in the minimum impedance of the circuit.
Therefore, at resonance, the impedance (Z) of the circuit is equal to the resistance (R) only.
Given:
R = 1.00 kΩ = 1000 Ω
Vrms = 408 V
Using Ohm's law, we can calculate the current (Irms) at resonance:
Irms = Vrms / R
Irms = 408 / 1000 = 0.408 A = 408 mA
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explain why one uses a lot of energy when blowing air in to a balloon for the first time
The end of Hubbard Glacier in Alaska advances by an average of 105 feet per year. What is the speed of advance of the glacier in m/s? ( 1 ft = 0.305 m, 1 yr = 3.156 × 10's )
1.01 x 10-6 m/sec is the speed of advance of the glacier in m/s
1 foot = .3048 meters
105 ft = 105(.3048) = 32.004 m
(365.25 days)(24 hrs/day)(60 min/hr)(60 sec/min)
= 31,557,600 sec/yr
m/sec = 32.004/31557600 = 1.0141455624 x 10-6 m/sec
Round to 1.01 x 10-6 m/sec
Hubbard Glacier has altered through time, how?Hubbard Glacier in Alaska has been slowly thickening and moving towards Disenchantment Bay since observations began in 1895. The progress contrasts with several neighbouring thinning and receding glaciers in Alaska and elsewhere in the world.
Hubbard Glacier's base ice is around 400 years old since it takes that long for ice to travel the glacier's entire length. Frequently, icebergs the size of a ten-story structure are calved off by the glacier.
Sea levels are rising as a result of glaciers, such those that cover Greenland, melting as a result of climate change.
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Please help answer questions
The following statement is NOT an example of a heteronormative society, Asking a heterosexual person "when did you know you were straight?" Option d is correct.
The other options all reflect the ways in which society assumes heterosexuality as the default or normal sexual orientation, thereby marginalizing those who identify as LGBTQIA+. For example, asking a homosexual person "when did you know you were gay?" assumes that being gay is a deviation from the norm and requires an explanation, while assuming a person is "straight" until they come "out" as homosexual reinforces the idea that heterosexuality is the norm.
Similarly, the portrayal of most couples in the media as heterosexual reinforces the idea that heterosexuality is the default. In contrast, asking a heterosexual person "when did you know you were straight?" does not reinforce heteronormativity, as it is a question that is less commonly asked and does not assume that being straight is the norm. Option d is correct.
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A simple machine is able to move a 400 N load a distance of 20 cm when a force of 20 N is moved through a distance of 5.0 m. Calculate: a)the work input b)the work output c)the actual mechanical advantage
(a) The work input on the machine is 10 J.
(b) The work output of the machine is 80 J.
(b) The Machanical advantage of the machine is 20.
What is a machine?Machine is any device that enables work to be done easily.
(a) To calculate the work input of the machine, we use the formula below
Formula:
W' = Ed'........................... Equation 1Where:
W' = Work inputE = Effortd' = Distance moved by effortFrom the question,
Given:
E = 20 Nd' = 0.5 mSubstitute these values into equation 1
W' = 20×0.5W' = 10 J(b) Also, for work output, we use the formula below
W = Ld................. Equation 2Where:
W = Work outputL = Load = 400 Nd = 20 cm = 0.2 mSubstitute these values into equation 2
W = 400×0.2W = 80 J(c) To calculate the mechanical advantage of the machine, we use the formula below
M.A = L/E..................... Equation 3Given:
L = 400E = 20 NSubstitute into equation 3
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A student repeats a reaction several times to test the effects of various
changes on the reaction rate. The data table shows the results. Based on
these results, how would decreasing the concentration of the reactants
change the reaction rate?
Conditions
Original
Higher concentration
Higher temperature
Metal added
5
Reaction Time (s)
10 seconds
5 seconds
5 seconds
5 seconds
OA. Decreasing the concentration would decrease the reaction rate.
OB. Decreasing the concentration would increase the reaction rate.
OC. Decreasing the concentration would have no effect on the reaction
rate.
OD. More information is needed to determine what would happen to
the reaction rate.
Answer:
Explanation:
the correct answer is option A: Decreasing the concentration would decrease the reaction rate.
State the difference between positive and negative zero error of a vernier calliper
Answer:
Positive zero error: When the jaws of the caliper are closed, the zero mark on the vernier scale is to the right of the zero mark on the main scale. This means that the caliper reads a value greater than the actual value, leading to a positive zero error.
Negative zero error: When the jaws of the caliper are closed, the zero mark on the vernier scale is to the left of the zero mark on the main scale. This means that the caliper reads a value less than the actual value, leading to a negative zero error.
11.1. Is ammeter A1 connected in series or in parallel in this diagram?
Ammeter is always connected in series with the circuit in which the current is to be measured.
An ammeter is connected, to gauge the current flowing through a part or circuit. Since current in a series connection stays constant and an ammeter's resistance is relatively low, the current being measured is unaffected. For the purpose of measuring current, an ammeter is linked in series.
A shunt running parallel to the metre carries the majority of the current at high current values, hence an ammeter can measure a wide range of current values. An ammeter is represented by a circle with a capital A inside it on circuit diagrams.
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A runner covers a distance of 500m in 14.5minutes. Calculate the average speed
Answer:
The formula to calculate average speed is:
average speed = total distance / total time
In this case, the distance covered is 500 meters and the time taken is 14.5 minutes. However, we need to convert the time to seconds to get the answer in meters per second.
14.5 minutes = 14.5 x 60 seconds = 870 seconds
So, the average speed is:
average speed = total distance / total time
average speed = 500 meters / 870 seconds
average speed = 0.57 meters per second
Therefore, the average speed of the runner is 0.57 meters per second.
The brass pipe pictured to the right has few of the trumpet’s attributes. There is no mouthpiece,
no bell, and no valves, but it is a brass tube that you could buzz your lips into. What is the lowest
note that would be possible to blow on this pipe?
10 cm
Answer: the lowest note that would be possible to blow on this brass pipe is approximately 1700 Hz
Explanation: f = c / (2L)
where c is the speed of sound in brass, which is around 340 m/s.
Changing over the length of the pipe to meters, we have:
L = 10 cm = 0.1 m
Stopping within the values, we get:
f = 340 / (2 x 0.1) = 1700 Hz
NO USE OF AI BOTS TO answer question pls answer thanks
Answer:
19.2 centimeters or 0.192 meters. Both are the same.
Explanation:
T = 2π√(L/g)
T = 60.0 s / 14 ≈ 4.29 s
L = (gT²) / (4π²) ≈ 0.384 m
h + 0.384 m = height above the field
H = h + 0.192 m
H = h
h ≈ 0.192 m or 19.2 cm.
In an unknown radioactive sample, the number of radioactive nuclei is observed to
decrease to 1/20 of the original number in a one-hour period. What is the half-life of this
substance (in minutes)?
The half-life of this substance, which decreases 1/20 of original in one hour is 13.9 minutes.
The number of radioactive nuclei in a sample follows an exponential decay model:
[tex]N(t) = N_0 e^{-\lambda t}[/tex],
where N(t) is the number of nuclei remaining after a time t, [tex]N_0[/tex] is the initial number of nuclei, and λ is the decay constant.
The time required for the number of nuclei to decrease to half of its initial value is called the half-life [tex]t_{1/2}[/tex] of the substance. We can use the given information to find the value of [tex]t_{1/2}[/tex]:
[tex]N(t) = \dfrac{1}{2} N_0 = N_0 e^{-\lambda t_{1/2}}[/tex]
Taking the natural logarithm of both sides, we get:
ln(1/2) = -λ[tex]t_{1/2}[/tex]
Solving for [tex]t_{1/2}[/tex], we obtain:
[tex]t_{1/2}[/tex] = ln(2)/λ
We are given that the number of radioactive nuclei decreases to 1/20 of the original number in one hour, which means that the fraction of nuclei remaining after one hour is:
[tex]\dfrac{N(1 hour)}{N_0} = \dfrac{1}{20}\\ = e^{-\lambda \times 1 hour}[/tex]
Solving for λ, we get:
λ = -ln(1/20)/1 hour
Substituting this value of λ into the expression for [tex]t_{1/2}[/tex], we get:
[tex]t_{1/2}[/tex] = ln(2)/(-ln(1/20)/1 hour) = 13.9 minutes
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If a pitch were thrown horizontally with a speed of 32.0 , how far would the ball fall vertically by the time it reached halfway to the home plate which is 19 away?
Once it was halfway to home plate, the ball would have dropped 1.75 meters vertically.
What is speed?How quickly anything is traveling is determined by its speed. The amount of space covered in a given amount of time is a scalar quantity. Calculating speed involves dividing the distance traveled by the time needed to complete that distance.
How do you determine it?The vertical displacement of the ball when it is halfway to home plate can be calculated using the equations of motion, assuming the pitch is delivered on a level field.
Gravitational acceleration is -9.81 m/s2 and the pitch's initial vertical velocity is zero. How long does it take for the pitch to go halfway to home plate?
t = d/v
t = 19 m / (32.0 m/s)
t = 0.594 s
The formula d = vit + 1/2at2 d = 0 + 1/2(-9.81 m/s2) *(0.594 s)2 d = -1.75 m can be used to determine the vertical displacement of the ball during this time.
The ball falls downhill vertically as expected, as indicated by the negative sign. Once it was halfway to home plate, the ball would have dropped 1.75 meters vertically.
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a parallel-plate capacitor consist of plates of area 1.5 *10^-4 m^2 and separation by 1.00mm. the capacitor is connected to a 12-V battery. What is the charge on the plates
The plates are charged to 1.593 10-9 C.
Calculation-
A parallel-plate capacitor's capacitance is determined by:
C = ∈0 A / d
where A is the area of the plates, d is the distance between them, and 0 is the electric constant, also referred to as the permittivity of empty space.
Inputting the values provided yields:
C = (8.85 × [tex]10^-12[/tex] F/m) * 1.5 × [tex]10^-4[/tex] [tex]m^2 / (1.00 × 10^-3 m) = 1.3275 × 10^-10 F[/tex]
Charges are placed on the plates by:
Q = CV
V stands for the voltage applied across the plates. Inputting the values provided yields:
[tex]Q = (1.3275 × 10^-10 F) * 12 V = 1.593 × 10^-9 C[/tex]
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Let's say you wanted to make a flute from one-inch PVC pipe. If the lowest desired note is C5 on the Equal Temperament Scale (523.25 Hz), what length should it be cut?
The PVC pipe should be cut to a length of 32.6 centimeters to produce a C5 note.
Pitch refers to the perceived highness or lowness of a sound, which is determined by its frequency. A higher frequency corresponds to a higher pitch, while a lower frequency corresponds to a lower pitch.
To determine the length of a flute made from PVC pipe that produces a desired pitch, we can use the formula:
L = (v/2f) * n
where L is the length of the pipe, v is the velocity of sound in air, f is the frequency of the desired pitch, and n is the number of open and closed nodes in the standing wave produced by the pipe.
For a pipe that is open on both ends (like a flute), n = 2. The velocity of sound in air is approximately 343 meters per second at room temperature.
To convert the desired frequency of C5 (523.25 Hz) to meters per second, we can use the formula:
v = f * λ
where λ is the wavelength of the sound wave. For C5, λ is approximately 0.65 meters (since the speed of sound in air is about 343 m/s, and the wavelength of C5 is 343 m/s divided by 523.25 Hz).
So, we can calculate the length of the PVC pipe needed for C5 as:
L = (v/2f) * n = (343/2*523.25) * 2 * 0.65 = 0.326 meters or 32.6 centimeters
Therefore, To create a C5 note, the PVC tubing should be cut to a length of about 32.6 centimeters.
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if the battery is 4.0V, the voltmeter reading across R is 2.0V and the resistance per unit length of wire AX is 2 ohm per metre, calculate the current in the circuit when /AP/ is 40.0cm. (neglect the internal resistance of the battery)
The current in the circuit when AP is 40.0 cm is 2.5 A.
We can use Ohm's law to calculate the current in the circuit:
V = IR
where V is the voltage, I is the current, and R is the resistance.
The resistance of the wire AX can be calculated as:
R = ρ ([tex]\frac{L}{A}[/tex])
where ρ is the resistivity of the wire material, L is the length of the wire, and A is the cross-sectional area of the wire.
Since the resistance per unit length of wire AX is given as 2 [tex]\frac{ohm}{m}[/tex] ,we can calculate the resistance of a 40 cm length of wire AX as:
R = (2 [tex]\frac{ohm}{m}[/tex]) × ([tex]\frac{40 cm}{100 \frac{cm}{m}}[/tex]) = 0.8 ohm
Using the voltmeter reading across R as 2.0V and the battery voltage as 4.0V, we can calculate the voltage across the wire AX as:
V = 4.0V - 2.0V = 2.0V
Therefore, we can calculate the current in the circuit as:
I = [tex]\frac{V}{R}[/tex] = [tex]\frac{2.0V }{0.8 ohm}[/tex] = 2.5 A
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6.
How many times more intense is the sound of a motorcycle (90 dB) passing by than an automobile (70 dB) passing by?
four times.
ten times
one hundred times
twenty times
Please answer this question, I’ll give brainliest if it’s correct!
Q7. A 230 kg piano must be lifted onto a stage that is 1.7 m high.
(a) If the piano is lifted straight up by some very strong people, how much force must they apply? [2 marks]
(b) How much work have they done? [2 marks]
(c) If the stage-crew only need to apply a force of 300 N to get the piano onto the stage if they use a 15 m ramp. How much work is done using the ramp? [2 marks]
(d) What is the efficiency of the ramp? [2 marks]
(e) You should notice that the force needed to lift the piano in A is larger than the force needed to lift the piano in C. How is it possible that the piano can be raised with much less force when the incline is used? (In other words, what is the "trade-off" of using an inclined ramp?) [2 marks]
Which of the following measurements is most precise?which one is the most accurate?Please explain
A
4.00 mm
B
4.00 cm
C
4.00 m
D
40.00 m
The 4.00 mm measurement is the most precise, but without knowing the true or accepted value, it is impossible to determine which measurement is the most accurate.
What is precision and accuracy?Precision refers to how close repeated measurements are to each other, while accuracy refers to how close a measured value is to the true or accepted value.
A 4.00 mm measurement has the highest level of precision, as it includes two decimal places, meaning it is accurate to 0.01 mm. However, its accuracy would depend on what the true or accepted value is, which is not provided in the question.
A 4.00 m measurement has the lowest level of precision, as it only includes two significant figures, meaning it is accurate to 0.01 m. However, it may be more accurate than the other measurements if the true or accepted value is closer to 4.00 m than to the other values.
A 40.00 m measurement has the same level of precision as the 4.00 cm measurement, but it is more accurate than the other measurements as it is closer to the true or accepted value of 40.00 m.
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A 21 g block of ice is cooled to −77 ◦C. It is added to 593 g of water in an 92 g copper calorimeter at a temperature of 28◦C. Find the final temperature. The specific heat of copper is 387 J/kg · ◦C and of ice is 2090 J/kg · ◦C . The latent heat of fusion of water is 3.33 × 105 J/kg and its specific heat is 4186 J/kg · ◦C . Answer in units of ◦C. ( 2 significant digits pls)
Answer:m 1= 36 g=0.036 kg - the mass of ice T1= −77 ◦C. - temperature of ice m2=589 g=0.589 kg - mass of water C1=2090 J/kg · ◦C - specific heat of ice λ = 3.33 × 10^5 J/kg - latent heat of fusion of water T2=26◦C. - temperature of water C2= 4186 J/kg · ◦C . - - specific heat of water m3=74 g=0.074kg - mass of copper T3=26◦C. - temperature of copper C3=387 J/kg ·◦C - specific heat of copper is and of ice is T - ? - final temperature 1 1 ( 0 − 1 ) − ℎ 0 1 − 1 2 ( − 0 ) − ℎ 2 2 ( − 2 ) − 3 3 ( − 3 ) − m 1 C 1 (0−T 1 )−ice heating to 0 o C m1λ−ice melting m 1 C 2 (T−0)−melted water heating m 2 C 2 (T−T 2 )−water cooling m 3 C 3 (T−T 3 )−copper cooling 1 1 ( 0 − 1 ) + 1 + 1 2 ( − 0 ) + 2 2 ( − 2 ) + 3 3 ( − 3 ) = 0 m 1 C 1 (0−T 1 )+m1λ+m 1 C 2 (T−0)+m 2 C 2 (T−T 2 )+m 3 C 3 (T−T 3 )=0 0.036 ⋅ 2090 ⋅ 77 + 0.036 ⋅ 3.33 ⋅ 1 0 5 + 0.036 ⋅ 4186 ⋅ + 0.589 ⋅ 2090 ⋅ ( − 26 ) + 0.074 ⋅ 387 ⋅ ( − 26 ) = 0 0.036⋅2090⋅77+0.036⋅3.33⋅10 5 +0.036⋅4186⋅T+0.589⋅2090⋅(T−26)+0.074⋅387⋅(T−26)=0 1410.344 ⋅ = 14969.368 = 10.6 1 1410.344⋅T=14969.368 T=10.61 o C Answer: = 10.6 1 T=10.61 o C
Explanation: