A box is being pulled to the right. What is the magnitude of the Kinect frictional force?

Answer:

Nicolaus Copernicus

Explanation:

Nevertheless, Copernicus began to work on astronomy on his own. Sometime between 1510 and 1514 he wrote an essay that has come to be known as the Commentariolus (MW 75–126) that introduced his new cosmological idea, the heliocentric universe, and he sent copies to various astronomers

Answer:

Q = - 4312 W = - 4.312 KW

Explanation:

The rate of heat of the concrete slab can be calculated through Fourier's Law of heat conduction. The formula of the Fourier's Law of heat conduction is as follows:

Q = - kA dt/dx

Integrating from one side of the slab to other along the thickness dimension, we get:

Q = - kA(T₂ - T₁)/L

Q = kA(T₁ - T₂)/t

where,

Q = Rate of Heat Loss = ?

k = thermal conductivity = 1.4 W/m.k

A = Surface Area = (11 m)(8 m) = 88 m²

T₁ = Temperature of Bottom Surface = 10°C

T₂ = Temperature of Top Surface = 17° C

t = Thickness of Slab = 0.2 m

Therefore,

Q = (1.4 W/m.k)(88 m²)(10°C - 17°C)/0.2 m

Q = - 4312 W = - 4.312 KW

Here, negative sign shows the loss of heat.

Answer:

Index of Refraction = 1.52

Explanation:

The index of refraction or the refractive index is given as:

Index of Refraction = Sin i/Sin r

where,

i = angle of incidence

r = angle of refraction

In this case of karo syrup, we have the following data:

i = angle of incidence  = 30°

r = angle of refraction = 19.24°

Therefore, substituting these values in the equation, we get:

Index of Refraction = Sin 30°/Sin 19.24°

Index of Refraction = 0.5/0.3295

Index of Refraction = 1.52

Hence, the refractive index or the index of refraction of the Karo Syrup is found to be 1.52.

Answer:

Explanation:

The maximum efficient power plant will be the plant based on carnot cycle whose efficiency is given by the following formula

Efficiency = (T₁ - T₂)  / T₁

T₁ is temperature of hot reservoir and T₂ is temperature of cold reservoir.

Putting the given values

efficiency of power plant = (35 - 5) / (273 + 35 )

= 30 / 308

= .097

= 9.7 %

Answer:

200A

Explanation:

Given that

the distance between earth surface and power cable d = 8m

when the current is flowing through cable , the magnitude flux density at the surface is 15μT

when the current flow throught is zero the magnitude flux density at the surface is 20μT

The change in flux density due to the current flowing in the power cable is

B = 20μT - 15μT

B =5μT -----(1)

The expression of magnitude flux density produced by the current carrying cable is

[tex]B=\frac{\mu_0I}{2\pi d}[/tex]-----(2)

Substitute the value of flux density

B from eqn 1 and eqn 2

[tex]\frac{\mu_0I}{2\pi d}=5\times 10^-^6\\\\\frac{(4\pi \times 10^-^7)I}{2 \pi (8)} =5\times 10^-^6\\\\I=200A[/tex]

Therefore, the magnitude of current I is 200A

Answer:

471392.4 N

Explanation:

From the question,

Just before contact with the beam,

mgh = Fd.................... Equation 1

Where m = mass of the beam, g = acceleration due to gravity, h = height. F =  average Force on the beam, d = distance.

make f the subject of the equation

F = mgh/d................ Equation 2

Given: m = 1900 kg, h = 4 m, d = 15.8 = 0.158 m

Constant: g = 9.8 m/s²

Substitute into equation 2

F = 1900(4)(9.8)/0.158

F = 471392.4 N

Answer:

a)  T = 1342.6 cos θ, b)  v = 13.93 √(sin θ tan θ)

Explanation:

We can solve this problem using Newton's second law

Let's fix a reference system with a horizontal axis and the other vertical, therefore the only force to decompose is the tension, in these problems the most common is to measure the angle with respect to the vertical. Let's use trigonometry to find the components of the dispute

      cos θ = [tex]T_{y}[/tex] / T

      T_{y} = T cos tea

     sin θ = Tₓ / T

     Tₓ = T sin θ

let's write Newton's second law

axis and vertical

      T cos θ - W = 0

       T = mg / cos θ

let's calculate

      T = 137  9.8 cos θ

       T = 1342.6 cos θ

unfortunately there is no drawing or indication of the angle

Axis x Horizontal

       T sin θ = m a

acceleration is centripetal

        a = v² / R

        T sin θ = m v² / R

        v² = (g / cos θ) R sin θ

        v = √ (gR tan θ)

let's use trigonometry to find radius of gyration

          sin θ = R / L

          R = L sin θ

         v = √ (g L  sin θ tan θ)

let's calculate

         v = √(9.8 19.8 sin θ tant θ)

         v = 13.93 √(sin θ tan θ)

they do not give the angle for which the calculation cannot be finished

Answer:

a) [tex]t \approx 9.879\,s[/tex], b) [tex]v = 20.518\,\frac{m}{s}[/tex], c) [tex]t = 16.368\,s[/tex], d) [tex]v = 19.545\,\frac{m}{s}[/tex]

Explanation:

a) Since train is only translating in a straight line and experimenting a constant deceleration throughout the station, whose length is 210 meters. The time required for the nose of the train to reach the end of the station can be found with the help of the following motion formula:

[tex]210\,m = \left(22\,\frac{m}{s}\right) \cdot t + \frac{1}{2}\cdot \left(-0.150\,\frac{m}{s^{2}} \right) \cdot t^{2}[/tex]

The following second-order polynomial needs to be solved:

[tex]-0.075\cdot t^{2} + 22\cdot t - 210 = 0[/tex]

Whose roots are presented herein:

[tex]t_{1}\approx 283.455\,s[/tex] and [tex]t_{2} \approx 9.879\,s[/tex]

Both solutions are physically reasonable, although second roots describes better the braking process of the train.

b) The speed of the nose leaving the station is given by this expression:

[tex]v = 22\,\frac{m}{s} + \left(-0.150\,\frac{m}{s^{2}}\right)\cdot (9.879\,s)[/tex]

[tex]v = 20.518\,\frac{m}{s}[/tex]

c) First, it is required to calculate the time when nose of the train reaches a distance of 130 meters.

[tex]130\,m = \left(22\,\frac{m}{s}\right) \cdot t + \frac{1}{2}\cdot \left(-0.150\,\frac{m}{s^{2}} \right) \cdot t^{2}[/tex]

[tex]-0.075\cdot t^{2} + 22\cdot t - 130 = 0[/tex]

Roots of the second-order polynomial are:

[tex]t_{1} \approx 287.300\,s[/tex] and [tex]t_{2} \approx 6.033\,s[/tex]

Both solutions are physically reasonable, although second roots describes better the braking process of the train. Now, the speed experimented by the train at this instant is:

[tex]v = 22\,\frac{m}{s} + \left(-0.150\,\frac{m}{s^{2}}\right)\cdot (6.033\,s)[/tex]

[tex]v = 21.095\,\frac{m}{s}[/tex]

The distance traveled by the end of the train throughout station is modelled after the following equation:

[tex]210\,m = \left(21.095\,\frac{m}{s}\right) \cdot t + \frac{1}{2}\cdot \left(-0.150\,\frac{m}{s^{2}} \right) \cdot t^{2}[/tex]

[tex]-0.075\cdot t^{2} + 21.095\cdot t - 210 = 0[/tex]

Roots of the second-order polynomial are:

[tex]t_{1} \approx 270.932\,s[/tex] and [tex]t_{2} \approx 10.335\,s[/tex]

Both solutions are physically reasonable, although second roots describes better the braking process of the train. The instant when the end of the train leaves the station is:

[tex]t = 6.033\,s + 10.335\,s[/tex]

[tex]t = 16.368\,s[/tex]

d) The velocity experimented by the end of the train is:

[tex]v = 21.095\,\frac{m}{s} + \left(-0.150\,\frac{m}{s^{2}} \right)\cdot (10.335\,s)[/tex]

[tex]v = 19.545\,\frac{m}{s}[/tex]

The negative sign indicates that the train comes to a stop before entering the station. Therefore, the nose of the train is not in the station at all. The negative sign indicates that the train is moving in the opposite direction of its initial velocity. The end of the train leaves the station after approximately 14.98 seconds. The velocity of the end of the train as it leaves the station is approximately 19.753 m/s.

(a) Using the equation :

v² = u² + 2as

0 = (22.0)² + 2 × (-0.150 ) × s

s = -(22.0 )^2 / (2 × -0.150)

s = 325.3 m

The negative sign indicates that the train comes to a stop before entering the station. Therefore, the nose of the train is not in the station at all.

(b) The velocity of the train when the nose leaves the station is given by:

v = u + at

v = 22.0 + (-0.150 ) × 210

v ≈ 22.0 - 31.5

v ≈ -9.5 m/s

The negative sign indicates that the train is moving in the opposite direction of its initial velocity.

(c)

s = ut + (1/2)at²

210= 22.0 × t + (1/2) × (-0.150) × t²

0.075 t² - 22.0 t + 210 = 0

we find two solutions for t: t ≈ 14.98 s and t ≈ 3.01 s.

The end of the train leaves the station after approximately 14.98 seconds.

(d) The velocity of the end of the train as it leaves the station is given by:

v = u + at

v = 22.0 + (-0.150) × 14.98

v = 22.0 - 2.247

v = 19.753 m/s

So, the velocity of the end of the train as it leaves the station is approximately 19.753 m/s.

To know more about the velocity:

https://brainly.com/question/17127206

#SPJ6

Answer:

option A.

Explanation:

Since the two lumps collide together, it is an inelastic collision.  An inelastic collision, in contrast to an elastic collision, is a collision in which kinetic energy is not conserved due to the action of internal friction. Part of the kinetic energy is changed to some other form of energy in the collision

Momentum is conserved in inelastic collisions. This means the correct option is option A.

After four half-lives, the amount that remains is (1/2)⁴ of the original sample.

That's (1/16) of 10 g, or 0.625 g.

It doesn't matter how long the half-life is.

A radioisotope has a starting mass of 10.0 g. Half lives of the isotopes are 0-10, 1-5, 2-2.25, 3-1.25, and 4-0.625 if the radioisotope has a half life of 2.75 years.

A chemical element in an unstable state that emits radiation as it decomposes and becomes more stable. Both the natural environment and a laboratory can produce radioisotopes. They are utilized in imaging studies and therapy in medicine.

In radioactivity, the half-life is the amount of time needed for half of a radioactive sample's atomic nuclei to spontaneously decay (convert into different nuclear species by emitting particles and energy), or, more precisely, the amount of time needed for the number of disintegrations per second.

To know more about Radioisotope, visit-

https://brainly.com/question/19472025

#SPJ2

Answer:

Del(ρ/ε₀) - (Del)²E = -dμ₀J/dt

Explanation:

From Maxwell's fourth equation

Curl B = μ₀J + μ₀ε₀dE/dt (1) where the second term is the displacement current.

If the oscillation conduction current in the conductor is much larger than the displacement current then, the displacement current goes to zero. So we have

Curl B = μ₀J  (2)(since μ₀ε₀dE/dt = 0)

From maxwell's third equation

Curl E = -dB/dt  (3)  

taking curl of the above from the left

Curl(Curl E) = Curl(-dB/dt)

Curl(Curl E) = (-d(CurlB)/dt)  (4)

Substituting for Curl B into (4), we have

Curl(Curl E) = -dμ₀J/dt

Del(DivE) - (Del)²E = -dμ₀J/dt    (5)

From Maxwell's first equation,

DivE = ρ/ε₀

Substituting this into (5), we have

Del(ρ/ε₀) - (Del)²E = -dμ₀J/dt

Answer:

1.97 m/s.

Explanation:

From the question,

Using the law of conservation of energy,

The energy stored in the charged plate = Kinetic energy of the mass

1/2(qV) = 1/2mv².......................... Equation 1

Where q = charge, V = voltage, m = mass, v = velocity.

make v the subject of the equation

v = √(qV/m)......................... Equation 2

Given: q = 6.5×10⁻⁶ C, V = 12000 Volts, m = 0.02 kg

Substitute these values into equation 2

v = √(6.5×10⁻⁶×12000 /0.02)

v = √3.9

v = 1.97 m/s.

Answer:

F = G(m1m2)/R2.

Explanation:

Newton's law of universal gravitation:

Gravitational Force, in Newtons, between two objects =

(a constant)·(one mass)·(the other mass)/(distance between them)²

acting on EACH object, in the direction of the other object.

If the masses are in kilograms and the distance is in meters, then the constant is 6.67 x 10⁻¹¹ m³/kg-sec² .

I may be wrong, but I don't think Newton had any number to use for the constant.  It had not been measured yet, the kilogram and the meter had not been invented yet, and there certainly was no unit called "a Newton" during his lifetime.

He might have been able to calculate the value of the constant by applying his law of gravity to the motion of one or two  planets. But he would have needed to know the mass of the sun and the planets he used, and I don't think those were known yet in Newton's time.  

Answer:

-2.7m/s

Explanation:

...............

Answer:

c. 25,000 frames/s

Explanation:

For computing the minimum frame rate for high speed first we have to determine the time by applying the following equation

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

[tex]= \frac{0.2\ mm}{4.6\ m/s }[/tex]

[tex]= \frac{0.2 \times 10 ^{-3}}{4.6\ m/s }[/tex]

[tex]= 4.347 \times 10^{-5} sec[/tex]

Now the frame rate is

[tex]Frame\ rate = \frac{1}{t}[/tex]

[tex]= \frac{1}{4.347 \times 10^{-5} sec}[/tex]

= 23,000 frame per sec

≈ 25,000 frame per sec

First we have find the time then after finding out the time we calculate the frame time by applying the above formula so that the minimum frame rate could come

Answer:

The speed will be "1.06 m/s".

Explanation:

The given values are:

Momentum,

m1 = 244 g

m2 = 45.2 g

On applying momentum conservation ,

Let v2 become the final golf's speed.  

From Momentum Conservation

⇒  [tex]Total \ initial \ momentum = Total \ final \ momentum[/tex]

⇒  [tex]m1\times u1 + m2\times u2 = m1\times v1 + m2\times v2[/tex]

On putting the estimated values, we get

⇒  [tex]0.244\times 57.6+0=0.244\times 39.9+45.2\times v2[/tex]

⇒  [tex]57.844+0=9.7356+45.2\times v2[/tex]

⇒  [tex]48.1084=45.2\times v2[/tex]

⇒  [tex]v2=\frac{48.1084}{45.2}[/tex]

⇒  [tex]v2=1.06 \ m/s[/tex]

Answer:

By exact formula

5076.59N/C

And by approximation formula

5218.93N/C

Explanation:

We are given that

Length of rod,L=2.6 m

Charge,q=98nC=[tex]98\times 10^{-9} C[/tex]

[tex]1nC=10^{-9} C[/tex]

a=13 cm=0.13 m

1 m=100 cm

By exact formula

The magnitude of  the electric field due to the rod at a location 13 cm from the midpoint of the rod=[tex]\frac{kq}{a}\times \frac{1}{\sqrt{a^2+\frac{L^2}{4}}}[/tex]

Where k=[tex]9\times 10^9[/tex]

Using the formula

The magnitude of  the electric field due to the rod at a location 13 cm from the midpoint of the rod=[tex]\frac{9\times 10^9\times 98\times 10^{-9}}{0.13}\times \frac{1}{\sqrt{(0.13)^2+\frac{(2.6)^2}{4}}}=5076.59N/C[/tex]

In approximation formula

a<<L

[tex]a^2+(\frac{L}{2})^2=\frac{L^2}{4}[/tex]

Therefore,the magnitude of  the electric field due to the rod at a location 13 cm from the midpoint of the rod=[tex]\frac{kq}{a}\times \frac{1}{\sqrt{\frac{L^2}{4}}}[/tex]

The magnitude of  the electric field due to the rod at a location 13 cm from the midpoint of the rod=[tex]\frac{9\times 10^9\times 98\times 10^{-9}}{0.13}\times \frac{1}{\sqrt{\frac{(2.6)^2}{4}}}=5218.93N/C[/tex]

Answer: 0.3 m/sec

Explanation:

Vrel = (Vs-Vm) = (0.8-0.5) = 0.3 m/sec

Answer:

0.3 m/s east

Explanation:

Answer:

The index of refraction of the gas is  [tex]n_g = 1.000922[/tex]

Explanation:

From the question we are told that

   The wavelength of light is  [tex]\lambda = 560 \ nm = 560 *10^{-9} \ m[/tex]

   The length of tube is  [tex]L = 5.10 \ cm = \frac{5.10 }{100} =0.0510 \ m[/tex]

    The number of fringes is  [tex]N = 168[/tex]

Generally the  index of refraction of the gas  is mathematically repreented as

      [tex]n_g = 1 + \frac{N \lambda }{2 L }[/tex]

substituting values

       [tex]n_g = 1 + \frac{168 *[ 560* 10^{-9}] }{2 * 0.0510 }[/tex]

       [tex]n_g = 1.000922[/tex]

Answer:

6.61 m/s²

Explanation:

Given:

Δx = 0.40 km = 400 m

v₀ = 0 m/s

t = 11.0 s

Find: a

Δx = v₀ t + ½ at²

400 m = (0 m/s) (11.0 s) + ½ a (11.0 s)²

a = 6.61 m/s²

Answer:

[tex]F=5.16\times 10^{15}\ N[/tex]

Explanation:

We have,

Mass of Mars is, [tex]m_M=6.42\times 10^{23}\ kg[/tex]

Mass of its moon Phobos, [tex]m_P=1.06\times 10^{16}\ kg[/tex]

Distance between Mars and Phobos, d = 9378 km

It is required to find the gravitational force between Mars and Phobos. The force between two masses is given by

[tex]F=G\dfrac{m_Mm_P}{d^2}[/tex]

Plugging all values, we get :

[tex]F=6.67\times 10^{-11}\times \dfrac{6.42\times 10^{23}\times 1.06\times 10^{16}}{(9378\times 10^3)^2}\\\\F=5.16\times 10^{15}\ N[/tex]

So, the gravitational force is [tex]5.16\times 10^{15}\ N[/tex].

Answer:

Current, I = 0.073 A

Explanation:

It is given that,

Number of turns in a long solenoid is 1080

Length of the solenoid is 0.420 m

It produces a magnetic field of [tex]10^{-4}\ T[/tex] at its center.

We need to find the current is required in the winding for that to occur. The magnetic field at the center of the solenoid is given by :

[tex]B=\mu_0 NI[/tex]

I is current

[tex]I=\dfrac{B}{\mu_o N}\\\\I=\dfrac{10^{-4}}{4\pi \times 10^{-7}\times 1080}\\\\I=0.073\ A[/tex]

Answer:

v₁ = √[ 2gh / ((A₁ / A₂)² − 1) ]

Explanation:

Use Bernoulli's equation:

P₁ + ½ ρ v₁² + ρgz₁ = P₂ + ½ ρ v₂² + ρgz₂

Since there's no elevation change between points 1 and 2, z₁ = z₂.

P₁ + ½ ρ v₁² = P₂ + ½ ρ v₂²

Assuming incompressible fluid, the volumetric flow rate is the same at points 1 and 2.

Q₁ = Q₂

v₁ A₁ = v₂ A₂

v₂ = v₁ A₁ / A₂

Substituting:

P₁ + ½ ρ v₁² = P₂ + ½ ρ (v₁ A₁ / A₂)²

P₁ + ½ ρ v₁² = P₂ + ½ ρ v₁² (A₁ / A₂)²

P₁ − P₂ = ½ ρ v₁² (A₁ / A₂)² − ½ ρ v₁²

P₁ − P₂ = ½ ρ v₁² ((A₁ / A₂)² − 1)

v₁² = 2 (P₁ − P₂) / (ρ ((A₁ / A₂)² − 1))

v₁² = 2 (ρgh) / (ρ ((A₁ / A₂)² − 1))

v₁² = 2gh / ((A₁ / A₂)² − 1)

v₁ = √[ 2gh / ((A₁ / A₂)² − 1) ]

Answer:

The maximum energy stored in the combination is 0.0466Joules

Explanation:

The question is incomplete. Here is the complete question.

Three capacitors C1-11.7 μF, C2 21.0 μF, and C3 = 28.8 μF are connected in series. To avoid breakdown of the capacitors, the maximum potential difference to which any of them can be individually charged is 125 V. Determine the maximum energy stored in the series combination.

Energy stored in a capacitor is expressed as E = 1/2CtV² where

Ct is the total effective capacitance

V is the supply voltage

Since the capacitors are connected in series.

1/Ct = 1/C1+1/C2+1/C3

Given C1 = 11.7 μF, C2 = 21.0 μF, and C3 = 28.8 μF

1/Ct = 1/11.7 + 1/21.0 + 1/28.8

1/Ct = 0.0855+0.0476+0.0347

1/Ct = 0.1678

Ct = 1/0.1678

Ct = 5.96μF

Ct = 5.96×10^-6F

Since V = 125V

E = 1/2(5.96×10^-6)(125)²

E = 0.0466Joules

Answer:

Explanation:

volume expansion coefficient = .000960 C⁻¹

d₀ = d ( 1 + .000960 x t )  , d is density at t and d₀ is density at 0 degree Celsius .

if t = 200

d₀= d ( 1 + .00096 x 200 )

= d ( 1 + .00096 x 200 )

= 1.192d

10 gallons of gasolene

= 10 x .0038 m³ of gasolene

= .038 m³

difference of mass = volume x difference of density

= .038 x ( d₀ - d )

.038 x ( d₀ - d₀ / 1.192 )

= .038 x ( 1 - 1 / 1.192 ) d₀

= .00612 x 730

= 4.468 kg .

Complete Question

The complete question is shown on the first uploaded image  

Answer:

a   it is always zero

b  0

c  [tex]\eta = -\epsilon _o E[/tex]

Explanation:ss

Here the  net charge is  on the outer surface of the conductor thus this means that the net charge inside the conductor is zero

Generally the charge density of a conductor is dependent on the charge per unit area  which implies that the charge density is dependent on the net charge  so this  means that the charge density inside the conductor is zero

Generally the direction of electric field this from the  positive charge to the negative charge  so from the question we can deduce  that the negative charge is located on the surface of the conductor

    So We can mathematically define the charge density on the surface of the electric field as

             ∮[tex]E \cdot dA = \frac{-Q}{\epsilon _o}[/tex]

Where E is the electric field

          [tex]dA[/tex] change in unit area

           [tex]-Q[/tex] is the negative charge

          [tex]\epsilon _o[/tex]  is the permittivity of free space

So

          [tex]EA = \frac{-Q}{\epsilon _o }[/tex]

           [tex]\frac{Q}{A} = -\epsilon _o E[/tex]

          [tex]\eta = -\epsilon _o E[/tex]

Where [tex]\eta[/tex] is the charge density

Answer:

a

The mass is  [tex]m_2 =21.75*10^{-27} \ kg[/tex]

b

The velocity is  [tex]v_2 = 3.0*10^{6} m/s[/tex]

Explanation:

From the question we are told that

     The speed of the protons is  [tex]u_1 = 2.10*10^{7} m/s[/tex]

     The mass of the protons is  [tex]m[/tex]

     The speed of the rebounding protons are [tex]v_1 = -1.80 * 10^{7} \ m/s[/tex]

The negative sign shows that it is moving in the opposite direction

Now according to the law of energy conservation mass of one nucleus of the unknown element. is mathematically represented as

        [tex]m_2 = [\frac{u_1 -v_1}{u_1 + v_1} ] m_1[/tex]

Where [tex]m_1[/tex] is the mass of a single proton

          So substituting values

       [tex]m_2 = \frac{2.10 *10^{7} - (-1.80 *10^{7})} {(2.10 *10^7) + (-1.80 *10^{7})} m_1[/tex]

        [tex]m_2 =13 m_1[/tex]

The mass of on proton is  [tex]m_1 = 1.673 * 10^{-27} \ kg[/tex]

So     [tex]m_2 =13 ( 1.673 * 10^{-27} )[/tex]

        [tex]m_2 =21.75*10^{-27} \ kg[/tex]

Now according to the law of linear momentum conservation the speed of the unknown nucleus immediately after such a collision is mathematically evaluated as

      [tex]m_1 u_1 + m_2u_2 = m_1 v_1 + m_2v_2[/tex]

Now  [tex]u_2[/tex] because before collision the the nucleus was at rest

So

        [tex]m_1 u_1 = m_1 v_1 + m_2v_2[/tex]

=>    [tex]v_2 = \frac{m_1(u_1 -v_1)}{m_2}[/tex]

Recall that [tex]m_2 =13 m_1[/tex]

So

       [tex]v_2 = \frac{m_1(u_1 -v_1)}{13m_1}[/tex]

=>         [tex]v_2 = \frac{(u_1 -v_1)}{13}[/tex]

substituting values

              [tex]v_2 = \frac{( 2.10*10^{7} -(-1.80 *10^{7}))}{13}[/tex]

              [tex]v_2 = 3.0*10^{6} m/s[/tex]