Two students are arguing over the differences between speed and velocity. One student says,

“Speed is a scalar because it describes how fast an object is traveling. Velocity is a vector because it tells how fast and in what direction an object is traveling.” Which of the following statements is correct? (AKS 1b3 DOK 3)

Question 3 options:

The student’s understanding of all four terms (speed, velocity, scalar, and vector) is correct.


The student’s understanding of speed and velocity is correct but their understanding of scalar and vector is incorrect.


The student’s understanding of all four terms (speed, velocity, scalar, and vector) is incorrect.


The student’s understanding of speed and velocity is incorrect but their understanding of scalar and vector is correct.

Explanation:

Given that,

Speed with which the bullet is fired, u = 136 m/s

Time, t = 1.3 s

We need to find the displacement of the bullet after 1.3 seconds. It can be calculated using second equation of motion as :

[tex]s=ut+\dfrac{1}{2}at^2[/tex]

Here, a = -g

[tex]s=ut-\dfrac{1}{2}gt^2[/tex]

[tex]s=136\times 1.3-\dfrac{1}{2}\times 9.8\times (1.3)^2[/tex]

s = 168.51 meters

So, the displacement of the bullet after 1.3 seconds is 168.51 meters. Hence, this is the required solution.

Answer:

Part 2: 4.30 m/s

Part 3: 1503 m/s^2

Explanation:

First you already had -5.29 m/s

Part 2

With what velocity does it leave the ground ?

it is the same process as question 1, but in this case the height is 0.945 m

[tex]v =\sqrt{2gh}[/tex]

[tex]v =\sqrt{2*9.8*0.945} \\v =4.30\ m/s[/tex]

Part 3

This is a simple formula of :

[tex]v_{f}-v_{i}=at \\where \\v_{f}: final\ speed \\v_{i}: initial\ speed \\a: acceleration\\t: time[/tex]

Final speed: is the speed the ball leaves the ground = 4.30 m/s

Initial speed: is the speed the ball hits the ground = -5.29 m/s

4.30 - (-5.29) = 0.00638a

a = 1503 m/s^2

Still 9.8 m/s^2 downward.

Without air resistance, the acceleration doesn't depend on the initial velocity or the weight of the object. It only depends on what planet you're on.

Answer:

h₂ = 27.22m : height the pellet reaches

Explanation:

Pellet kinetics

Pellet moves with uniformly accelerated movement in  

freefall  

v f₁²=v₀²+2g*h₁ (formula 1)  : ball movement down

v f₂²=v₀²-2g*h₂ (formula (formula 2)  : ball movement up

d:displacement in meters (m)  

v₀: initial speed in m/s  

vf: final speed in m/s  

g: acceleration due to gravity in m/s²

h :height in m

Known data  

g=9.8 m/s²

h₁=12.7m

v f₁= 27.9 m/s

Initial velocity calculation (v₀)

We replace the data in formula 1:

27.9²=v₀²+2*9.8* 12.7

27.9²-2*9.8* 12.7=v₀²

529.49=v₀²

[tex]v_{o} =\sqrt{529.49}[/tex]

[tex]v_{o} =23.1\frac{m}{s}[/tex]

Calculation of the height that the pellet reaches when it goes up

Data:

[tex]v_{o} =23.1\frac{m}{s}[/tex]

v f₂=0 :When the pellet reaches the maximum height the final speed is zero

We replace the data in formula (2)

0²=23.1²-2*9.8*h₂

19.6h₂ =23.1²

h₂ =23.1²÷19.6

h₂ =27.22m

Answer:longer

Explanation:

Answer:

Longer

Explanation:

Answer:

[tex]\frac{dx}{dt}=7.14m/s[/tex]

Explanation:

As is showed at the figure annexed, we can solve this problem finding the relation between the girl displacement and the shadow displacement.

Relation the triangles (see figure annexed):

[tex]\frac{x}{H}=\frac{x-y}{h}\\x=\frac{H}{H-h}y[/tex]

We derive in order to find the speed of the shadow, because:

dx/dt: shadow's speed

dy/dt: girl's speed

[tex]\frac{dx}{dt} =\frac{25}{25-4}*6=7.14m/s[/tex]

Answer:

584.3 m at [tex]135.7^{\circ}[/tex] above the positive x-axis

Explanation:

We have to find the magnitude and direction of the resultant vector. In order to do that, we have to resolve each vector along the x- and y- direction first.

Resolving the vector L:

[tex]L_x = L cos \theta_L = 303 \cdot cos 205^{\circ} =-274.6m\\L_y = L sin \theta_L = 303 \cdot sin 205^{\circ} = -128.1 m[/tex]

Resolving the vector M:

[tex]M_x = M cos \theta_M = 555 \cdot cos 105^{\circ} =-143.6 m\\M_y = M sin \theta_M = 555 \cdot sin 105^{\circ} = 536.1 m[/tex]

Now we can find the components of the resultant vector by adding the components of each vector along each direction:

[tex]R_x = L_x + M_x = -274.6 +(-143.6)=-418.2 m\\R_y = L_y + M_y = -128.1 +536.1 = 408 m[/tex]

So the magnitude of the resultant vector is

[tex]R=\sqrt{R_x^2 + R_y^2}=\sqrt{(-418.2)^2+(408)^2}=584.3 m[/tex]

While the direction is given by:

[tex]\theta = tan^{-1} \frac{R_y}{R_x}=tan^{-1} \frac{408}{418.2}=44.3^{\circ}[/tex]

But since [tex]R_x[/tex] is negative and [tex]R_y[/tex] is positive, it means that this angle is measured as angle above the negative x-axis; so the direction of the vector is actually

[tex]\theta = 180^{\circ} - 44.3^{\circ} = 135.7^{\circ}[/tex]

Answer:

a) 90 miles is the distance between town and John's current location.

b) John's current position is the 104 mile marker.

Explanation:

See in the picture.

Answer:

A) Although the speed is the same, the direction has changed. Therefore, the velocity has changed.

Explanation:

Final answer:

The velocity of a ball changes after bouncing off a wall because while its speed remains the same, its direction is reversed. Therefore, the ball's velocity and momentum experience a change, but the overall system momentum is conserved. So the correct option is A.

Explanation:

When considering whether the velocity of a ball changes after it bounces off a wall, it is important to understand that velocity is a vector quantity, meaning it has both magnitude (speed) and direction. If a ball is thrown against a wall and bounces back with the same speed but in the opposite direction, its velocity has indeed changed due to a change in direction. The correct answer here is A) Although the speed is the same, the direction has changed. Therefore, the velocity has changed. The mass of the ball is irrelevant to the consideration of velocity in this context, as velocity does not depend on mass.

Additionally, during this process, the ball experiences a change in momentum. Momentum is also a vector, and the direction of the ball's momentum is reversed upon bouncing off the wall while maintaining the same magnitude, assuming an elastic collision with no energy loss. The change in the direction of the ball's velocity also indicates a reversal in momentum. However, the total system momentum, including the wall and the ball, remains conserved.

Answer:

Final velocity will be 556.8 m/sec

Explanation:

We have given the average rate of change of velocity that is [tex]a=5.8\times 10^5m/sec[/tex]

Time [tex]t=9.6\times 10^{-4}sec[/tex]

Initial velocity of bullet will be zero that is u=0

Now according to first law of motion

v=u+at, here v is final velocity, u is initial velocity and t is time

So [tex]v=0+5.8\times 10^5\times 9.6\times 10^{-4}=556.8m/sec[/tex]

Answer: 384,300,000 m

Explanation:

Speed [tex]S[/tex] is mathematically expressed as:

[tex]S=\frac{d}{t}[/tex]

Where:

[tex]S=c=3(10)^{8} m/s[/tex] is the speed of light

[tex]d[/tex] is the distance traveled

[tex]t=\frac{2.562 s}{2}=1.281 s[/tex] since [tex]2.562 s[/tex] is the time it takes to the pulse to go the moon and return.

Finding [tex]d[/tex]:

[tex]d=c t[/tex]

[tex]d=(3(10)^{8} m/s)(1.281 s)[/tex]

Finally:

[tex]d=384,300,000 m[/tex]

Answer:

B. Nebular Hypothesis

Explanation:

It is important to read the statement carefully so we can rule out options. The text is referring to solar system formation, it means we should discard all options which are not related to that. Big bang theory is a concept to explain the origin of the whole universe, not the solar system only, so it is discarded. Plate tectonics describes inner earth layers that are essential parts of the planet movemements like earthquakes and they are not related to solar system either. Discarded. Helioentric theory is the idea that defines the sun as the center of the solar system, but again it does not explain anything about its origin, so let me explain a litte in detail about the right choice: Nebular Hypothesis.

Nebular Hypothesis

This is the way astronomers accept the solar system was created as well as other other plantetary systems. Million of years after Big Bang, there were gases and small dust particles all over the universe and they started to join and concentrate into bigger and bigger amount of gases turning into enourmous clouds made of all the necessary elements to begin the formation of stars, planets and eventually the solar system.

Answer: [tex]38\ m[/tex]

Explanation:

For this exercise you can use the Pythagorean theorem to find the magnitude of the resultant displacement.

Then:

[tex]d^2=\triangle x^2+\triangle y^2[/tex]

You can observe that the square of the displacement is equal to the sum of the square  of the horizontal displacement and the square of the vertical displacement.

Since the pirate walks 37.0 meters north and then turns and walks 8.5 meters east:

[tex]\triangle x=37.0\ m\\\triangle y=8.5\ m[/tex]

Substituting values and solving for "d", you get:

[tex]d=\sqrt{(37.0\ m)^2+(8.5\ m)^2}\\\\d=38\ m[/tex]

Answer:

38.77 kg

Explanation:

The weight of an object is given by:

Weight = mg,  g = acceleration due to gravity ( 9.8 m/s square)

and m is the mass.

So, in this case:

Weight of dog is 382 N, so, by putting the values of weight and g into the equation we will get the mass of dog.

382 = mass multiply with 9.8

so, the mass of the dog will be 38.77 kg

Answer:

1.336 m

Explanation:

q = - 3.77 micro C at y = 0 m

Q = - 4.92 micro C at y = 2.86176 m

Let the electric field is zero at P which is at a distance y from origin.

Electric field at P due to q is equal to the electric field at P due to Q.

[tex]E_{q}=E_{Q}[/tex]

[tex]\frac{kq}{OP^{2}}=\frac{kQ}{AP^{2}}[/tex]

[tex]\frac{3.77}{y^{2}}=\frac{4.92}{\left ( 2.86176-y \right )^{2}}[/tex]

[tex]\frac{\left ( 2.86176-y \right )}{y}}=1.142[/tex]

2.86176 - y = 1.142 y

2.142 y = 2.86176

y = 1.336 m

Thus, the electric field is zero at y = 1.336 m.

To find the speed of the object after it has fallen 4.0 cm, we can use the principles of conservation of energy and Hooke's law. The potential energy stored in the spring when it is stretched by 4.0 cm is given by U = 1/2kx^2, where k is the spring constant and x is the displacement. The gravitational potential energy of the object when it is at a height of 4.0 cm can be calculated as mgx, where m is the mass and g is the acceleration due to gravity. Equating these two expressions for potential energy and solving for the speed of the object, we find v = sqrt((2gh - kx^2)/m), where h is the distance from the equilibrium position to the lowest point of the object. Plugging in the given values, we have v = sqrt((2 * 9.8 m/s^2 * 0.04 m - 200 N/m * 0.04 m^2) / 2 kg) = 1.6 m/s.

To find the speed of the object after it has fallen 4.0 cm, we can use the principles of conservation of energy and Hooke's law. The potential energy stored in the spring when it is stretched by 4.0 cm is given by U = 1/2kx^2, where k is the spring constant and x is the displacement. The gravitational potential energy of the object when it is at a height of 4.0 cm can be calculated as mgx, where m is the mass and g is the acceleration due to gravity. Equating these two expressions for potential energy and solving for the speed of the object, we find v = sqrt((2gh - kx^2)/m), where h is the distance from the equilibrium position to the lowest point of the object. Plugging in the given values, we have v = sqrt((2 * 9.8 m/s^2 * 0.04 m - 200 N/m * 0.04 m^2) / 2 kg) = 1.6 m/s.

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Answer:

0.79 s

Explanation:

The initial velocity of the ball is, [tex]u=7.79 m/s[/tex].

And now we know that first equation of motion.

[tex]v=u+at[/tex]

Here, v is the final velocity, u is the initial velocity, t is time taken by the object, a is the acceleration.

Given that, final velocity is zero and ball is inb upward direction means opposite to acceleration due to gravity which means a=-g. and the value of g is [tex]9.8 m/s^{2}[/tex]

Therefore,

[tex]0=u-gt\\t=\frac{u}{g}\\ t=\frac{7.79}{9.8}\\ 0.79 s[/tex]

Therefore, it is the required minimum time that player must waiot to touch the ball.

Answer:

18.3 m , 25.4°

Explanation:

d1 = 6 m, θ1 = 40°

d2 = 8 m, θ2 = 30°

d3 = 5 m, θ3 = 0°

Write the displacements in the vector form

[tex]d_{1}=6\left ( Cos40\widehat{i}+Sin40\widehat{j} \right )=4.6\widehat{i}+3.86\widehat{j}[/tex]

[tex]d_{2}=8\left ( Cos30\widehat{i}+Sin30\widehat{j} \right )=6.93\widehat{i}+4\widehat{j}[/tex]

[tex]d_{3}=5\widehat{i}[/tex]

The total displacement is given by

[tex]\overrightarrow{d}=\overrightarrow{d_{1}}+\overrightarrow{d_{2}}+\overrightarrow{d_{3}}[/tex]

[tex]d=\left ( 4.6+6.93+5 \right )\widehat{i}+\left ( 3.86+4 \right )\widehat{j}[/tex]

[tex]d=16.53\widehat{i}+7.86\widehat{j}[/tex]

magnitude of resultant displacement is given by

[tex]d ={\sqrt{16.53^{2}+7.86^{2}}}=18.3 m[/tex]

d = 18.3 m

Let θ be the angle of resultant displacement with + x axis

[tex]tan\theta =\frac{7.86}{16.53}=0.4755[/tex]

θ = 25.4°

Answer: Ok, first start writing our movement equation.

First our acceleration will be the gravity; so a= g

integrating we can obtain the velocity  v= g*t + v₀

where v₀ depends on if we trhow the egg upsides or downsides, being the positive direction downsides.

after, the position will be r = [tex]\frac{gt^{2} }{2}[/tex] +  v₀*t - 12m

where the -12m is because you are upside a building.

first case: straight down with speed 11m/s

so the velocity is positive

then, if we  do [tex]\frac{10*t^{2} }{2}[/tex] +  11*t - 12m = 0 and with bashkara obtain the positive root for the time t=1.6 seconds

putting this on our velocity equation you will get v = 10*1.6 + 11 = 27m/s is the velocity of the egg when it hits the ground.

for the other case, our equation will have the form of:

 [tex]\frac{10*t^{2} }{2}[/tex] -  11*t - 12m = 0

and the positive root of the time is: t = 3 seconds.

putting it in the velocity equation gives you v= 10*3 - 11 = 29m/s

which is bigger than the first case, so the egg hits the ground with more velocity, ence more energy.

Final answer:

Throwing the egg straight down with an initial speed of 11 m/s from a 12 m height will result in a higher impact speed, calculated using the kinematic equation for final velocity, which factors in both the initial speed and acceleration due to gravity.

Explanation:

To maximize the impact of the egg and break it the hardest in the egg drop contest, we need to consider the effect of throwing it downward with an initial speed. If the egg is thrown straight down with an initial velocity of 11 m/s from a 12 m high building, it will gain speed due to gravity in addition to the initial speed given. The final velocity just before impact can be calculated using the kinematic equation:

v2 = u2 + 2gh

where v is the final velocity, u is the initial velocity, g is the acceleration due to gravity (9.8 m/s2), and h is the height.

Substituting the given values:

v2 = (11 m/s)2 + 2(9.8 m/s2)(12 m)

v2 = 121 m2/s2 + 235.2 m2/s2

v2 = 356.2 m2/s2

v = √356.2 m2/s2 ≈ 18.9 m/s

Therefore, throwing the egg straight down at 11 m/s will result in a higher impact speed upon hitting the ground compared to throwing it upwards or dropping it without initial velocity.

Answer:

Acceleration will increase.

Explanation:

The relation between force, mass and acceleration according to the Newton's second law of motion is given as:

F = ma

We are given that the driving force on the truck remains constant, so F is constant here. We can rewrite the above equation as:

[tex]a=\frac{F}{m}[/tex]

Since, F is constant, the acceleration of the truck is inversely proportional to the mass.

There is a hole at the bottom of the truck through which the sand is being lost at a constant rate. Since, the sand is being lost, the overall mass of the truck is being reduced.

Since, the acceleration of the truck is inversely proportional to the mass, the reduced mass will result in an increased acceleration.

So, the acceleration of the truck will increase.

As the truck loses mass due to leaking sand, while a constant driving force is maintained, the acceleration of the truck increases according to Newton's second law of motion.

The question is about the changes in the acceleration of a truck as it loses mass due to leaking sand. From a physics perspective, the truck's acceleration will actually increase as it loses mass. This is because the force propelling the vehicle remains constant while its mass decreases. According to Newton's second law of motion, which states that force equals mass times acceleration (F=ma), if the force remains constant and mass decreases, the acceleration must increase to keep the equation balanced.

For example, with initial values, if the force propelling the truck is 30 newtons and the truck (with its sand) has a mass of 15 kilograms, the acceleration would be 2 m/s² (from F=ma, or 30N=15kg*a). Now suppose the sand leaks out and the truck’s mass drops to 10kg. If the driving force stays the same at 30N, when plugging these values back into F=ma, the new acceleration would be 3 m/s². Thus, the acceleration of the truck has increased as it has lost mass.

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Final answer:

The magnitude of the force the 24-kg box applies to the 62-kg box on a frictionless surface can be calculated using Newton's second law (F=ma), considering both boxes as a single system to find the combined acceleration, then applying that acceleration to determine the force on the 62-kg box.

Explanation:

To find the magnitude of the force that the 24-kg box applies to the 62-kg box, we need to apply Newton's second law of motion which states that the force acting on an object is equal to the mass of the object multiplied by its acceleration (F=ma). Since the 42-N pushing force is applied to the 24-kg box, this force is responsible for accelerating both the 24-kg and 62-kg boxes, which are considered to be one system in this context. Therefore, the acceleration of the system can be calculated using a = F_total/m_total, where F_total is the total force (42 N) and m_total is the combined mass of both boxes (24 kg + 62 kg).

Once the acceleration is known, the force exerted by the 24-kg box on the 62-kg box can be found by calculating the force needed to accelerate the 62-kg box at the previously determined acceleration. This is found using the same equation F=ma, where m is the mass of the 62-kg box and a is the acceleration of the system.

The density of the shuttle is 0.0491 mol/L, and the specific volume is 20.4 L/mol.

To find the density, we can use the ideal gas law, which states that the density of an ideal gas is equal to its pressure divided by its temperature and the ideal gas constant. The formula for density (ρ) is: ρ = P / (R * T), where P is the pressure, R is the ideal gas constant, and T is the temperature in Kelvin. In this case, the pressure is 1.2 atm and the temperature is 300 K. Using the ideal gas constant for air (R = 0.0821 L * atm / (mol * K)), we can calculate the density:

ρ = 1.2 atm / (0.0821 L * atm / (mol * K) * 300 K) = 0.0491 mol / L

To find the specific volume, we can use the reciprocal of density. The specific volume (v) is equal to 1 / density. So, the specific volume for the given conditions is:

v = 1 / 0.0491 mol / L = 20.4 L / mol

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Answer:

[tex]v_1 = 896.35 m/s[/tex]

Explanation:

As we know that bullet + pendulum system will move to the height of 0.650 m above the initial position

so here we can use energy conservation to find the speed just after the bullet hit the block

[tex]mgh = \frac{1}{2}mv^2[/tex]

[tex]v = \sqrt{2gh}[/tex]

[tex]v = \sqrt{2(9.81)(0.650)}[/tex]

[tex]v = 3.57 m/s[/tex]

Now we can use momentum conservation to find the initial speed of the bullet

[tex]m_1v_1 = (m_1 + m_2)v[/tex]

[tex]0.0100 v_1 = (2.50 + 0.01)(3.57)[/tex]

[tex]v_1 = 896.35 m/s[/tex]

Answer:

21 seconds

Explanation:

First, convert km/hr to m/s.

69 km/hr × (1000 m / km) × (1 hr / 3600 s) = 19.2 m/s

Distance = rate × time

400 m = 19.2 m/s × t

t = 20.9 s

Rounded to two significant figures, it takes the horse 21 seconds.

Answer:

The answer to your question is: 21 seconds

Explanation:

Data

speed = v = 69 km/h

distance = d = 400 m

time = t = ?

Formula

v = d / t

t = d / v

Process

Convert 400 m to km

                                 1 km ----------------- 1000 m

                                 x     -------------------   400 m

                                x = (400 x 1) / 1000

                                x = 0.4 km

Substitution

                      t = 0.4 / 69

                      t = 0.006 h

Covert time to minutes and seconds

                     60 min -------------------- 1  h

                     x            -------------------  0.006 h

                     x = (0.006 x 60) / 1

                     x = 0.36 min

Convert time to seconds

                     1 min ------------------  60 s

                   0.36 min --------------   x

                     x = (0.36 x 60) / 1

                     x = 21.6 seconds  ≈ 21 seconds

Answer:

various parts have been answered

Explanation:

Inverse square for light is [tex]I_1r_1^2=I_2r_2^2[/tex]

initial distance from sun to earth is[tex]r_1=150\times10^6 [/tex]

and intensity or apparent brightness of sun is [tex]I_1=1300\ W/m^2[/tex]

a)

If distance from sun to earth is [tex]r_2=r_1/2=\frac{150\times10^6}{2}[/tex]

then apparent brightness is  [tex]I_2=\frac{I_1r_1^2}{r_2^2}=\frac{1300\times r_1^2}{(r_1/2)^2}=5200[/tex]

b)

If distance from sun to earth is  [tex]r_2=2r_1[/tex]

then apparent brightness is  [tex]I_2=\frac{I_1r_1^2}{r_2^2}=\frac{1300\times r_1^2}{(2r_1)^2}=325\,W/m^2[/tex]

c)

If distance from sun to earth is  [tex]r_2=7r_1[/tex]

then apparent brightness is

[tex]I_2=\frac{I_1r_1^2}{r_2^2}=\frac{1300\times r_1^2}{(7r_1)^2}=26.5\,W/m^2[/tex]

Using the inverse square law, Earth's fraction of intercepted solar energy and the Sun's total power output are calculated based on the given distance and apparent solar brightness. The result shows Earth intercepts a minuscule part of the Sun's total energy output.

This question concerns the application of the inverse square law for light and the calculation of the Sun's total power output based on its apparent brightness from Earth. Given that Earth is approximately 150 million kilometers (or 1.5 × 1011 meters) away from the Sun and the apparent brightness of the Sun (also known as solar constant) at Earth is about 1300 watts/m2, we can determine several key aspects:

Fraction of the Sun’s energy striking Earth: Using Earth’s diameter of about 12,756 km (or 1.2756 × 107 meters), the cross-sectional area of Earth (which is a circular area) can be calculated as AEarth = π(1.2756 × 107/2)2 ≈ 1.28 × 1014 m2.

Total power output of the Sun: Applying the inverse square law, which states that the total power output P of the Sun is distributed over a sphere of radius equal to Earth’s orbit (1.5 × 1011 meters). The surface area of this sphere is A = 4π(1.5 × 1011)2 ≈ 2.83 × 1023 m2. The total power output (luminosity) L of the Sun can be calculated by multiplying this surface area by the apparent brightness (1300 W/m2), yielding L = (1300 W/m2) × (2.83 × 1023 m2) ≈ 3.68 × 1026 watts.

In essence, Earth intercepts a tiny fraction of the Sun’s total energy, owing to the vast difference in scales between the size of Earth and the distance to the Sun.

Answer:

19.2 m/s

Explanation:

The train is moving at 18 m/s and you are walking in the same direction (east) so the speeds are added

18 + 1.2 = 19.2

If you were walking backwards (west) your velocity with respect to the ground would be

18 - 1.2 = 16.8

Answer:

13.82 m/s

Explanation:

You can see it in the pic.

Answer:

vo = 13.74 m/s

Explanation:

The goal is to find the initial velocity vo. According to the exercise, the maximum height that the ball will reach and the initial height will be respectively, yo = 1.5 m and ymax = 7 m, tmax will be equal to the time it takes for the ball to reach the maximum height. Having the equation:

vx = vo * cos∝o

clearing vo:

vo = vx/cos∝o

vy = vo * sin∝o + gtmax

0 = sin∝o * (vx/cos∝o) + gtmax

0 = vx * tan∝o + gtmax

gtmax = -vx * tan∝o

clearing tmax:

tmax = - (vx * tanao/g)

ymax = i + (vo * sin∝o) * tmax + (gtmax^2/2)

Replacing:

ymax = i - (vx^2 * tan^2∝o/2 * g)

clearing the angle a or:

∝o = arctan (((2 * g * (i - ymax)) / vx^2)^1/2)

substituting values:

∝o = arctan (((2 * (- 9.8) * (1.5 - 7)) / (9^2))) = 49.08 °

We find the initial speed with the following formula:

vo = vx/cos∝o = 9/cos49.08 ° = 13.74 m/s

Answer: 3250 N in the opposite direction

Explanation:

According to Newton's third law of motion:

"Each action has an equal and opposite reaction"

To understand it better:  

When two bodies interact between them, appear equal forces and opposite senses in each of them.  For example, if a body A exerts a force on another body B, it performs on A another force with the same magnitude and in the opposite direction.

Hence, this law states that for each force acting on a body, ther is a force of equal intensity but in the opposite direction on the body that produced it.

In this sense if the car hit the concrete barrier with a force of 3250 N, the concrete barrier will exert a force of -3250 N on the car (where the negative sign indicates the force is acting in the opposite direction).

Answer:3250 , third law

Explanation:

Answer:

The average speed will be 2.54 Km/h

Explanation:

Given that

A to B

Distance = 175175 m=175.175 KM

B to C

Distance = 7070 m=7.07 Km

Lets take time taken from B to C is t then A to B will be t+66

We know that

Distance = velocity x time

175.175 =  V x (t+66)              -------------1

7.070 = V x t                      -------------2

From equation 1 and 2

t=2.77 hr

Now by putting the values in equation 2

7.07 = V x 2.77

V = 2.54 Km/h

So the average speed will be 2.54 Km/h

Answer:

Uniform

Directed from the negative to the positive plate

Explanation:

The field inside a charged parallel-plate capacitor is __________.

• zero

• directed from the negative to the positive plate

• parallel to the plates

• uniform

A parallel plate capacitor is made of two opposite charged plates.

As a universal rule the electric field is directed from the negative charge to the positive charge. So in the capacitor the field is directed from the negative plate to the positive plate

Also the electric field inside the capacitor is constant irrespective of the location.

[tex]E = \frac{\sigma }{ \epsilon_{0} \epsilon_{r} } \\[/tex]

Where

[tex]\sigma[/tex] is the surface charge density

[tex]\epsilon_{0}[/tex] is the permittivity of free space

[tex]\epsilon_{r}[/tex] is the relative permittivity of the material inside the plates

The field inside a charged parallel-plate capacitor is uniform, directed from the negative to the positive plate, and parallel to the plates, with magnitude E = σ / ε₀.

The field inside a charged parallel-plate capacitor is uniform, directed from the negative to the positive plate, and parallel to the plates. At points far from the edges of the plates, the electric field is perpendicular to the plates and is constant in both magnitude and direction, as described in Essential Knowledge 2.C.5. This uniform field can be used, for example, to produce uniform acceleration of charges between the plates, such as in the electron gun of a TV tube.

Note that the electric field outside the region between the two plates is essentially zero because the fields from the positive and negative plates point in opposite directions and cancel each other out, except near the edges of the plates. The magnitude of the electrical field in the space between the parallel plates can be expressed as E = σ / ε₀, where σ denotes the surface charge density on one plate and ε₀ is the permittivity of free space.