Dry air will break down if the electric field exceeds 3.0*10^6 V/m. What amount of charge can be placed on a parallel-plate capacitor if the area of each plate is 73 cm^2?

Answer:

The shift in the color's depends on the angle of incidence, for a special case when the angle of incidence is along the normal to the surface no shift will be observed.

Explanation:

When a ray of light is incident on a medium perpendicular to it it does not undergo any refraction thus no shift will be seen.

Answer:

The distance between the emergent red and blue light is 3 cm

Solution:

As per the question:

Thickness of the glass plate, s = 10 cm = 0.1 m

Refractive index of blue light, [tex]n_{blue} = 1.6[/tex]

Refractive index of blue light, [tex]n_{red} = 1.3[/tex]

Now, to calculate the distance between red and blue light as it emerges from the plate:

We know that refractive index is given as the ratio of speed of light in vacuum, c or air to that in medium, [tex]v_{m}[/tex].

[tex]n = \frac{c}{v_{m}}[/tex]

[tex]v_{m} = \frac{c}{n}[/tex]            (1)

Since, c is constant, thus

n ∝ [tex]\frac{1}{v_{m}}[/tex]

Now, the refractive index of blue light is more than that of red light thus its speed in medium is lesser than red light.

Now, time taken, t by red and blue light to emerge out of the glass slab:

[tex]s = v_{m}\times t[/tex]

[tex]t = \frac{s}{v_{blue}} = \frac{sn_{blue}}{c}[/tex]

In the same time, red light also traveled through the glass covering some distance in air say x

[tex]t' = \frac{s}{v_{red}} = \frac{sn_{red}}{c}[/tex]          (2)

Time taken by red light to cover 'x' distance in vacuum is t'':

[tex]t" = \frac{x}{c}[/tex]

Now,

t = t' + t"           (3)

From eqn (1), (2) and (3):

[tex]\frac{sn_{blue}}{c} = \frac{sn_{red}}{c} + \frac{x}{c}[/tex]

Now, putting appropriate values in the above eqn:

[tex]\frac{0.1\times 1.6}{c} = \frac{0.1\times 1.3}{c} + \frac{x}{c}[/tex]

[tex]\frac{0.16}{c} - \frac{0.13}{c} = \frac{x}{c}[/tex]

x = 0.03 m = 3 cm

Answer:

Answered

Explanation:

A) False , horizontal velocity component is constant since there's no horizontal acceleration component

B) False, acceleration remains constant through out and only verticle acceleration is there horizontal acceleration is zero.

C) True , Its horizontal velocity doesn't change once it is in air, but its vertical velocity does change ( because of acceleration in verticle direction)

D)False, the acceleration is constant through the motion.

E)False, Vertical velocity is Zero but there will be Horizontal velocity.

Answer:

A ) 1000 m.

Explanation:

Here initial velocity u = 100 m /s

Final velocity v = 0

Acceleration a = -5 ms⁻²

Distance travelled = S

v² = u² + 2aS

0 = (100)² -2 x 5 S

S = 10000/ 10

=1000 m.

Answer:

the speed of the bird is 2.8 m/s in after 11 seconds.

Explanation:

given,

displacement of bird = 28 m

time taken of the displacement of 28 m = 11 s

distance = speed × time                      

velocity = [tex]\dfrac{displacement}{time}[/tex]

             =[tex]\dfrac{28}{10}[/tex]  

             = 2.8 m/s                                                  

hence, the speed of the bird is 2.8 m/s in after 11 seconds.

Answer:

a ) 10.61 X 10⁴ N/C

b )29.37 ms⁻² .

Explanation:

Since the weight of the object is balanced by force by electric field , the force must be acting in upward direction . In an electric field , an electron experiences a force opposite to the direction of field , therefore ,direction of electric field must be in downward  direction .

Let E be the electric field . Force on the charge

= electric field x charge = E x 2.4 x 10⁻⁶

Weight acting downwards = .026 x 9.8

For balancing

.026 x 9.8 =  E x 2.4 x 10⁻⁶

E = .026 x 9.8 / 2.4 x 10⁻⁶

=  10.61 X 10⁴ N/C

b )

If the charge is quadrupled , charge becomes 4 x 2.4 x 10⁻⁶

Upward force = 4 x 2.4 x 10⁻⁶ x 10.61 X 10⁴ = 101.85 x 10⁻²

Down ward force =.026 x 9.8

Net force = 101.85 x 10⁻² - .026 x 9.8

= .7637 N

acceleration = .7637 / .026 = 29.37 ms⁻² .

Answer:

1.93 kg water/kg iron

Explanation:

All the thermal energy from the iron is transferred to the water. In equilibrium, the temperature of both the water and the iron will be the same. The heat that an object loses or gains after a change in value in its temperature is equal to:

[tex]Q = mc*(T_f-T_o)[/tex]

Then,

[tex]-Q_{iron} = Q_{water}[/tex]

Before solving the problem, let's convert the values of temperature to Celsius:

(550°F -32)*5/9 = 287.78 °C

(75°F - 32)*5/9 = 23.89 °C

(100°F -32)*5/9 = 37.78°C

Now, we can solve:

[tex]-Q_{iron} = Q_{water}\\m_{iron}*c_{iron}*(T_o_i-T_f_i) = m_{water}*c_{water}*(T_f_w-T_o_w)\\\frac{m_{water}}{m_{iron}} = \frac{c_{iron}(T_o_i-T_f_i)}{c_{water}(T_f_w-T_o_w)} =\frac{448J/kg^oC(287.78^oC - 37.78^oC)}{4186J/kg^oC(37.78^oC-23.89^oC)}= 1.93 kg_{water}/kg_{iron}[/tex]

Answer:[tex]=\frac{8.014}{4.5}=1.78 m/s^2[/tex]

Explanation:

Given

mass of block(m)=4.5 kg

Horizontal force([tex] F_h[/tex])=3.7 N

another force F at angle of [tex]43^{\circ}[/tex]

if F is pulling Block then

Net Normal reaction=mg-Fsin43=40.12 N

Net Force in Horizontal direction =3.7+Fcos43

=3.7+4.31=8.014 N

thus Net acceleration is a[tex]=\frac{8.014}{4.5}=1.78 m/s^2[/tex]

Answer:

1.4 m/s^2

Explanation:

The angle of repose or the angle of sliding is defined as the angle of inclined plane with the horizontal at which an object placed on the plane is just start to slide down.

The relation between the angle of friction and the coefficient of static friction is given by

[tex]\mu _{s}=tan\theta[/tex]

[tex]\mu _{s}=tan38=0.78[/tex]

Thus, the coefficient of static friction is 0.78.

(b) As the crate is moving down, then the friction force is kinetic friction.

The force acting along the plane downward = mg Sinθ

The normal reaction, N = mg cosθ

The friction force acting upward along the plane, f = μk N = μk mg Cosθ

The net force acting along the plane downward

Fnet = mg Sinθ - μk mg Cosθ

According to the newton's second law, Fnet = mass x acceleration

so,  m x a = mg Sinθ - μk mg Cosθ

a = g Sinθ - μk g Cosθ

here, μk = 0.6 and θ = 38°, g = 9.8 m/s^2

By substituting the value, we get

a = 9.8 ( Sin38 - 0.6 x Cos 38)

a = 9.8 (0.6156 - 0.6 x 0.788)

a = 1.4 m/s^2

The coefficient of static friction between the crate and the ramp surface is 0.781. The acceleration of the moving crate is 5.88 m/s².

To find the coefficient of static friction, we need to calculate the tangent of the angle at which the crate begins to slide. The tangent of 38 degrees is approximately 0.781. Since the crate remains in place until this angle, the coefficient of static friction must be equal to or greater than this value. Therefore, the coefficient of static friction between the crate and the ramp surface is 0.781.

To find the acceleration of the moving crate, we can use the formula a = μk * g, where a is the acceleration, μk is the coefficient of kinetic friction, and g is the acceleration due to gravity. Given that the coefficient of kinetic friction is 0.600, and the acceleration due to gravity is approximately 9.8 m/s², we can substitute these values into the formula to find the acceleration.

Substituting the values, we get a = (0.600) * (9.8) = 5.88 m/s². Therefore, the acceleration of the moving crate is 5.88 m/s².

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Answer:

The diameter of the lead cylinder is 1.35 cm.

Explanation:

Given that,

Density of silver = 10.5 g/cm³

Density of lead = 11.3 g/cm³

Diameter = 1.4 cm

As mass of both is equal.

Let diameter of lead [tex]d_{l}[/tex]

We need to calculate the the diameter of the lead cylinder

Using balance equation of density

[tex]V\times \rho_{s}=V\times \rho_{l}[/tex]

[tex]\dfrac{\pi\times d_{s}^2\times h}{4}\times\rho_{s}=\dfrac{\pi\times d_{l}^2\times h}{4}\times\rho_{s}[/tex]

[tex]d_{l}^2=\dfrac{d_{s}^{2}\times\rho_{s}}{\rho_{l}}[/tex]

put the value into the formula

[tex]d_{l}^2=\dfrac{(1.4\times10^{-2})^2\times10.5}{11.3}[/tex]

[tex]d_{l}=\sqrt{0.00018212}[/tex]

[tex]d_{l}=0.0135\ m[/tex]

[tex]d_{l}=1.35\ cm[/tex]

Hence, The diameter of the lead cylinder is 1.35 cm.

Answer:

Yes, it's possible.

Explanation:

The average velocity is a mean value:

[tex]Vavg=\frac{displacement}{time taken}[/tex].

during that displacement, it may occur that the acceleration would negative at any time so at that moment if the velocity goes in the same direction with the acceleration, the velocity will be negative, it may take just a few moments and then go positive again. The velocity can also take negative values if for a moment the object was going backward (opposite direction). so the average velocity only means that the major of the velocity was positive.

Answer:

39 cm /s

77.25 cm approx

Explanation:

Angle of projection θ = 47.7°

Maximum height H = 42.4 cm

Initial velocity = u =?

we know that

maximum height

H = U² x sin²θ / 2g

U² = H x 2g /sin²θ

Putting the values

U² =( 42.4 X 2 X9.8 ) / (sin47.7)²

U = 39 cm /s

Horizontal Range R = U²sin2θ / 2g

= 39 x 39 x (sin95.4) / 2 x 9.8

R = 77.25  cm approx

Final answer:

In this question, we determine the takeoff speed and horizontal distance covered by a froghopper during a leap. Calculations involve kinematic equations and trigonometry to find these values accurately.

Explanation:

Takeoff speed: To find the takeoff speed, we can use the fact that the maximum height reached by the froghopper is related to its initial velocity. By using the kinematic equation for projectile motion, we can calculate the takeoff speed to be approximately 0.75 m/s.

Horizontal distance covered: The horizontal distance covered can be determined by analyzing the horizontal component of the motion. With the takeoff angle and the calculated initial speed, the horizontal distance traveled can be found using trigonometry to be around 0.91 m.

Answer:

The angular speed of the pendulum is 3.138 rad/s.

Explanation:

Given that,

Length = 99.5 cm

Mass = 185 g

We need to calculate the angular speed

Using formula of angular speed

[tex]\omega=\sqrt{\dfrac{g}{l}}[/tex]

Where, l = length

g = acceleration due to gravity

Put the value into the formula

[tex]\omega=\sqrt{\dfrac{9.80}{99.5\times10^{-2}}}[/tex]

[tex]\omega=3.138\ rad/s[/tex]

Hence, The angular speed of the pendulum is 3.138 rad/s.

Answer:

Explanation:

a ) Equation for car 1

X = 20 t + 1/2 x 0.40 t² ( initial velocity is 20 and acceleration is 0.4 )

Equation for car 2

X = 800 - ( 26 t - 1/2 x0.80 t² ) [ when t = 0 , X = 800 m and  with time t , X decreases ]

b ) Let after time t  they  meet , then X will be equal for both of them at t.

20 t + 1/2 x 0.40 t² = 800 - ( 26 t - 1/2 x0.80 t² )

0.20 t²- 46 t +800 = 0

t = 19 s and 211 s .

The equation of motion for car 1 is x = 20t + 0.2t^2. For car 2, it's x = 800 + 26t - 0.4t^2. To find when the cars meet each other, set these equal to each other and solve for t.

The x-versus-t equations of motion would be determined by rate of movement and acceleration. For car 1, which is accelerating positively, the equation of motion is x = v1*t + 0.5*a1*t^2 (where v1 = initial velocity of car 1, a1 = acceleration of car 1, t is time). So, it would be x = 20t + 0.5 * 0.4 * t^2 = 20t + 0.2t^2.

For car 2, decelerating negatively and starting at 0.80 km east of the origin (which equates to 800m), the equation is x = x2 + v2*t - 0.5*a2*t^2. This works out to x = 800 + 26t - 0.5 * 0.8 * t^2 = 800 + 26t - 0.4t^2.

To find the time (t) when cars pass each other, we equate the two displacements: 20t + 0.2t^2 = 800 + 26t - 0.4t^2. Solving that equation gives us the time in seconds when the cars will meet next to each other.

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Explanation:

First lets understand the 2nd law of motion by Sir Isaac Newton. According to this law,

[tex]Force = mass\times acceleration[/tex]

[tex]Velocity = acceleration\times time[/tex]

Since the spy is in space there is no medium and hence no friction to restrict the motion. Thus, when the spy turns on the jet pack, she will be accelerated and her velocity will increase. As there is no medium so no friction. So even when she turns her jet-pack off the velocity will not change. Although the acceleration will be zero but she will be moving with a constant velocity until an opposite force is applied. That can be done using reverse thrust.

Answer:

The mass of snow accumulated in the lawn in 1 hour equals 57.024 kilograms

Explanation:

Given

Width of lawn = 16 feet

Length of lawn = 20 feet

Thus total area of lawn equals [tex]16\times 20=320sq.feet[/tex]\

Now it is given that 1 square foot accumulates 1350 new snowflakes each minute thus number of snowflakes accumulated by 320 square feet in 1 minute equals

[tex]320\times 1350=432000[/tex]

Now it is given that average mass of each snowflake is [tex]2.20mg=2.20\times 10^{-3}g=2.20\times 10^{-6}kg[/tex]

Hence the mass accumulated per minute equals [tex]432000\times 2.20\times 10^{-6}=0.9504kg[/tex]

Now since there are 60 minutes in 1 hour thus the mass accumulated in 1 hour equals [tex]0.9504kg\times 60=57.024kg[/tex]

Answer:

[tex]E=2K\lambda d\dfrac{L }{d^2\sqrt{L^2+d^2}}[/tex]

Explanation:

Given that

Length= 2L

Linear charge density=λ

Distance= d

K=1/(4πε)

The electric field at point P

[tex]E=2K\int_{0}^{L}\dfrac{\lambda }{r^2}dx\ sin\theta[/tex]

[tex]sin\theta =\dfrac{d}{\sqrt{d^2+x^2}}[/tex]

[tex]r^2=d^2+x^2[/tex]

So

[tex]E=2K\lambda d\int_{0}^{L}\dfrac{dx }{(x^2+d^2)^{\frac{3}{2}}}[/tex]

Now by integrating above equation

[tex]E=2K\lambda d\dfrac{L }{d^2\sqrt{L^2+d^2}}[/tex]

Answer:

B) n=5

Explanation:

We call the initial value Xo. We start to double this initial value

X1=2*Xo     n=1

We double again:

X2=2*X1=2*(2Xo)      n=2

X2=2*X1=2^2*Xo      n=2

In general:

Xn=(2^n)*Xo

If we want to reach a value 32 times its initial value:

2^n=32

then: n=5

2^5=2*2*2*2*2=32

Explanation:

The charge on the electron is, [tex]q=-1.6\times 10^{-19}\ C[/tex]

The electric field at a distance r from the electron is :

[tex]E=k\dfrac{q}{r^2}[/tex]

Where

k is the electrostatic constant, [tex]k=\dfrac{1}{4\pi \epsilon_o}[/tex]

We know that the electric field lines starts from positive charge and ends at the negative charge. Also, for a positive charge the field lines are outwards while for a negative charge the field lines are inwards.

So, the correct option is " the  electric field is directed toward the electron and has a magnitude of [tex]k\dfrac{q}{r^2}[/tex]. Hence, this is the required solution.

Answer and Explanation:

A potential divider, as the name itself gives  a clear description of a simplified circuit which divides the potential across different circuit elements.

The potential divider circuit divides the potential depending upon the respective value of the elements of the circuit,

Given circuit diagram shows a potential divider circuit.

The working of this circuit is as :

[tex]V' = \frac{R'}{R + R'}V[/tex]

where

V = Input voltage

V' = output voltage

Answer:

a) 4.2 m/s

b) 13.6 m/s^2

Explanation:

She is jumping, and when her feet no longer touch the ground she is in free fall, only affected by the acceleration of gravity.

The equation for position under constant acceleration is:

Y(t) = Y0 + Vy0 * t + 1/2 * a * t^2

We set up a reference system that has its origin at the point her center of mass is when she is standing and the positive Y axis points upwards, then:

Y0 = 0 m

a = -9.81 m/s^2

The equation for speed under constant acceleration is:

V(t) = Vy0 + a * t

We know that when she reaches her highes point her vertical speed will be zero because that is wehn her movement changes direction. We'll call this moment t1.

0 = Vy0 + a * t1

a * t1 = -Vy0

t1 = -Vy0/a

If we replace this value on the position equation we can find her initial speed:

Y(t1) = Y0 - Vy0 * Vy0/a + 1/2 * a * (-Vy0/a)^2

Y(t1) = - Vy0^2/a + 1/2 * Vy0^2/a

Y(t1) = -1/2 * Vy0^2 / a

Vy0^2 = -2 * a * Y(t1)

[tex]Vy0 = \sqrt{-2 * a * Y(t1)}[/tex]

[tex]Vy0 = \sqrt{-2 * (-9.81) * 0.9} = 4.2 m/s[/tex]

I assume her center of mass is at half her height, so when she is standing it would be at 93 cm of the grouind, and when she is crouching at 46.5 cm.

Therefore when she jumps her centr of mass moves 0.465 m before leaving the ground.

During that trajectory she moves with acceleration.

Y(t) = Y0 + Vy0 * t + 1/2 * a *t^2

In this case her initial position is

Y0 = -0.465

Her initial speed is

Vy0 = 0

At t=t0 her position will be zero

The equation for speed under constan acceleration is

Vy(t) = Vy0 + a * t

Her speed at t0 will be 4.2 m/s

4.2 = a * t0

t0 = 4.2 / a

0 = -0.465 - 1/2 * 9.81 * (4.2 / a)^2

0.465 = 4.9 * 17.6 / a^2

a^2 = 86.2 / 0.465

[tex]a = \sqrt{185.4} = 13.6 m/s^2[/tex]

Answer: 730 kWh

Explanation: To solve this problem we have to use the following considerations:

If teh heat recovery ventilator consumes 83.2 W running 24 hs we have a consumed energy of:

Energy consumed= 83.2* 24= 2 kWh

so in a year we must multiply by 365 then

Energy consumed in a year= 2kWh*365= 730 kWh

Answer:

No the sonic boom is not heard by the passenger travelling in a supersonic aircraft. They do not experience any shift in the frequency as they are travelling at the speed of the source itself.Thus option 'a' is correct answer.

Explanation:

Sonic boom is a shock wave of sound associated when a source travels faster than the speed of sound in the ambient conditions. In a shock wave associated with the sonic boom there exists high gradients of pressure, density and temperature of air across the shock wave. The shock wave travels at the speed of the sound but the source (in our case the passenger) travels at a faster speed than the sound in ambient conditions.

Answer:

60 cycles

Explanation:

The first thing we must do to solve the problem is to find how many cycles are presented in 1cm by multiplying the frequency by the base time of the

K=time base=2ms/cm=2x10-3s/cm

f=frecuency=3000s^-1

N=fk

N=(3000)(2x10^-3)=6cycles/cm

Ntot=6x10=60cycles

Answer:

60 wave cycles

Explanation:

As the horizontal axis in a oscilloscope represents time, the time base is simply the scale, in other words, the amount of time that each division of oscilloscope represents. Therefore, multiplying the width of the screen times the time base will give us the total amount of time graphed on the screen.

The frequency is the amount of oscillations or waves cycles per second. So, in order to find the total amount of oscillations:

[tex]10cm *  \frac{0.002 s}{cm} *\frac{3000cycles}{s} = 60 cycles[/tex]

Final answer:

The local acceleration of gravity at the pilot's initial elevation is 0.952 ft/s². At a different elevation with gravity at 32.05 ft/s², her weight would be 4006.25 lbf, but her mass remains the same at 125 lb.

Explanation:

To find the local acceleration of gravity, we use the formula weight = mass × gravity. The pilot's weight is 119 lbf, and her mass is 125 lb. We rearrange the formula to find gravity: gravity = weight / mass, which gives us 119 lbf / 125 lb.

The local acceleration of gravity at the pilot's elevation is therefore 0.952 ft/s². Now, if the pilot drifts to another elevation where gravity is 32.05 ft/s², her weight in pounds-force would be her mass times the new acceleration due to gravity, which is 125 lb × 32.05 ft/s². Hence, her new weight would be 4006.25 lbf. Her mass remains unchanged as mass is not dependent on gravity.

Final answer:

The local acceleration of gravity at the given elevation is 0.952 ft/s². When the balloon drifts to another elevation with an acceleration of gravity of 32.05 ft/s², the pilot's weight is 4006.25 lbf and the mass is 125 lb.

Explanation:

At a certain elevation, the pilot's weight is less than the mass due to the reduction in the acceleration of gravity. To find the local acceleration of gravity, we need to use the equation:

weight = mass * acceleration of gravity

For the given values, the pilot's weight is 119 lbf, and the mass is 125 lb. Rearranging the equation, we have:

acceleration of gravity = weight / mass

Substituting the values, we get:

acceleration of gravity = 119 lbf / 125 lb = 0.952 ft/s²

When the balloon drifts to another elevation where the local acceleration of gravity is 32.05 ft/s², we can use the same equation to find the new weight and mass. Rearranging the equation, we have:

weight = mass * acceleration of gravity

Substituting the new acceleration of gravity and the previous mass, we get:

weight = 125 lb * 32.05 ft/s² = 4006.25 lbf

Therefore, at the new elevation, the pilot's weight is 4006.25 lbf and the mass is 125 lb.

Answer:

[tex]t=18.18s[/tex]

Explanation:

From the exercise we know that the person change its initial velocity from 5m/s to 11 m/s for 200m

According to the formula:

[tex]v=\frac{x}{t}[/tex]

If we want to know how much time does it take to cover 200 m at 11 m/s we need to calculate the following formula:

[tex]t=\frac{x}{v}=\frac{200m}{11m/s}=18.18s[/tex]

Answer:

C)The Same

Explanation:

Kinematics equation:

[tex]y=v_{oy}*t+1/2*g*t^2[/tex]

for both cases the initial velocity in the axis Y is the same, equal a zero.

So the relation between the height ant temps is the same for both cases (the horizontal velocity does not play a role)

C)The Same

Answer:

The total displacement from the starting point is 1.5 m.

Explanation:

You need to sum and substract, depending on the movement (to the right, sum; to the left, substract).

First, it moves 4.3 m right and return 1.1 m. So the new distance from the starting point is 3.2 m.

Second, it moves 6.3 m right, so the new distance is 9.5 m.

Finally it moves 8 m to the left, so 9.5 m - 8 m= 1.5 m.

Summarizing, at the end the squirrel is 1.5 m from its starting point.

Answer:

The average speed was 10.12 m/s or 22.96 mi/h

Explanation:

The average speed is defined as:

[tex]v = \frac{d}{t}[/tex]   (1)

Where d is the total distance traveled and t is the passed time.

For the special case of Joseph DeLoach, he traveled a total distance of 200 meters in 19.75 seconds. Those values can be introduced in equation 1:

[tex]v = \frac{200 m}{19.75 s}[/tex]

[tex]v = 10.12 m/s[/tex]

That means that Joseph DeLoach traveled a distance of 10.12 meters per second.

To represent the result in miles per hour, it is necessary to know that 1 mile is equivalent to 1609 meters.

[tex]200 m x \frac{1 mi}{1609 m}[/tex] ⇒ 0.124 mi

it is needed to express the given time in units of hour. 1 hour is equivalent to 3600 seconds.

[tex]19.75 s x \frac{1 h}{3600 s}[/tex] ⇒ 0.0054 h

Then, equation 1 is used with the new representation of the values.

[tex]v = \frac{0.124 mi}{0.0054 h}[/tex]

[tex]v = 22.96 mi/h[/tex]

Answer:

The mass of the bullet is 15 g.

(b) is correct option.

Explanation:

Given that,

Momentum = 2.8 kg m/s

Speed = 187 m/s

We need to calculate the mass of the bullet

Using formula of momentum

[tex]P = mv[/tex]

[tex]m = \dfrac{P}{v}[/tex]

Where, P = momentum

v = speed

Put the value into the formula

[tex]m = \dfrac{2.8}{187}[/tex]

[tex]m = 0.015\ kg[/tex]

[tex]m = 15\ g[/tex]

Hence, The mass of the bullet is 15 g.

Explanation:

Given that,

She walks in east,

Speed = 0.80 m/s

Time = 4.0 min

In north,

Speed = 0.50 m/s

Time = 5.5 min

In west,

Speed = 1.1 m/s

Time = 2.8 min

(a). We need to calculate the unit-vector velocities for each of the legs of her journey.

The velocity of her in east

[tex]\vec{v_{1}}=0.80\ \hat{x}\ m/s[/tex]

[tex]\vec{v_{2}}=0.50\ \hat{y}\ m/s[/tex]

[tex]\vec{v_{3}}=1.1\ \hat{-x}\ m/s[/tex]

(b). We need to calculate the unit-vector displacements for each of the legs of her journey

Using formula of displacement

[tex]\vec{d_{1}}=v_{1}\times t_{1}[/tex]

In east ,

[tex]\vec{d_{1}}=0.80\times4.0\times60[/tex]

[tex]\vec{d_{1}}=192\ \hat{x}\ m[/tex]

In north,

[tex]\vec{d_{2}}=0.50\times5.5\times60[/tex]

[tex]\vec{d_{2}}=165\ \hat{y}\ m[/tex]

In west,

[tex]\vec{d_{3}}=1.1\times2.8\times60[/tex]

[tex]\vec{d_{3}}=184.8\ \hat{-x}\ m[/tex]

(c). We need to calculate the  net displacement from the postal truck after her journey is complete

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

Put the value in the formula

[tex]\vec{d}=192\hat{x}+165\hat{y}+184.8\hat{-x}[/tex]

[tex]\vec{d}=7.2\hat{x}+165\hat{y}[/tex]

We need to calculate the magnitude of the displacement

[tex]d=\sqrt{(7.2)^2+(165)^2}[/tex]

[tex]d=165.16\ m[/tex]

The magnitude of the displacement is 165.16 m.

Hence, This is the required solution.