Calculus 3 Final Exam Review

Chapter 12 + 13

Chapter 14

Chapter 15

Chapter 16

LA Trivia :)

100

[12.3]

Set up the equation to find the arc length of the following curve:

r=2θ for 0≤θ≤2π

(I have to write it on the board because I will have to pay to include an image of the answer)

100

[14.2]

Find the velocity of the following function:

r(t)=<tsin(t),t²,tcos(t)>

r'(t)=<tcos(t)+sin(t),2t,-tsin(t)+cos(t)>

100

[15.5]

Find the gradient vector of:

f(x,y)=8xy-x²-2y²

nabla f=<-4,16>

100

[16.5]

Convert (-1,sqrt(3),2) into cylindrical and spherical cooardinates

cylindrical: (2,2π/3,2)

spherical: (2sqrt(2),π/4,2π/3)

100

What type of craft does Lorelei like to do?

Crochet

200

[13.3]

Compute the dot product between the 2 following vectors:

u=2j-4k and v=i-3j+2k

u.v=-14

200

[14.4]

Find the arc length of the following curve:

r(t)=<5t-1,t,4t+6> from 0≤t≤1

L=sqrt(42)

200

[15.5]

Find the direction derivative of nabla f=<-4,16> in the direction <sqrt(2)/2,sqrt(2)/2).

D_uf=6sqrt(2)

200

[16.1]

Compute the double integral of y*e^xydA over the region R={(x,y)|0≤x≤2,0≤y≤7}

V=1/2[e¹⁴-15]

200

Where does Lorelei work (other than the university)?

Connecticut Agricultural Experiment Station

300

[13.4]

Find the torque produced by a 30N force applied at 30° to a 0.30m long wrench

τ=4.5 N*m

300

[14.3]

Describe the trajectory of the particle moving along the function:

r(t)=3cos(t)i+5sin(t)j+4cos(t)k

The particle moves on a sphere of radius 5 centered at the origin.

300

[15.6]

Find the linear approximation of ln(1+x+y) at (0,0) and estimate the value of f(0.07,-0.12)

L(x,y)+x+y

L(0.07,-0.12)=-0.05

300

[16.3]

Find the volume of the solid bounded by z=-16+x²+y² and the xy-plane

V=128π

300

What other class has Lorelei LA'd before?

Physics with Dr. Poplawski

400

[13.3]

Find the work done by the force F=<2,2,3> along the segment P(0,0,1) to Q(0,6,6).

W=27J

400

[14.2]

Find the unit tangent vector of r(t) given:

r'(t)=<tcos(t)+sin(t),2t,-tsin(t)+cos(t)> at t=π

(Hint: I gave you the derivative of r)

I will write the answer on the board

400

[15.6]

Find the equation of the tangent plane to the surface:

xy+xz+yz=12 at the point (4,3,2)

5(x-4)+6(y-3)+7(z-2)=0

5x+6y+7z=52

400

[16.2]

Reverse the bounds of integration and evaluate:

(I will write on the board)

V=1/2

400

What is Lorelei's undergraduate degree and current degree program?

Undergrad: Forensic science with a conc. in chem

Grad: Chemistry

500

[13.4]

Find the vector orthogonal to the 2 vectors:

u=2j-4k and v=i-3j+2k

uxv=-8i+4j-2k

uxv=<-8,4,-2>

500

[14.3]

A baseball is hit at an initial velocity v(0)=<30,30> in m/s. Assume the only force is gravity (9.8m/s²). Find the velocity function of the ball.

v(t)=<30,-9.8t+30>

500

[15.7]

Find and describe the critical points of:

f(x,y)=4x²+y²-16x-6y+17

The critical point (2,3) is a local min

500

[16.4]

Find the average temperature of of the box D={(x,y,z)=0≤x≤2,0≤y≤2,0≤z≤2} with the temperature distribution T(x,y,z)=x²+xy+y²+z²

Average temperature=5

500

Lorelei has many pets (9). Guess the name of ONE of them.

Options: Mayvis, Tilly, Drucy, Sylvester, Lisle, Buford, Cheech, Smitty, the pleco that no one knows the name of, but it is probably the name of a vacuum brand.