Calculus Exam - Integration Jeopardy Template

That was easy

Definately Fun

Oh That Crazy S Word

Areal View

Va-Va-Volumes

100

Integrate ∫(4x^2+x+3)dx

What is 4/3x^3+x^2/2+3x+C

100

Use the Fundamental Theorem of Calculus to evaluate ∫(3+x)dx on [0,8]

What is 56

100

Integrate ∫[x^2/(sqrt(x^3+3))]dx

What is 2/3 sqrt(x^3+3)+C

100

Use a right endpoint rectangular model to estimate the area under the curve f(x)=x^2 between x = 0 and x = 3 using 6 rectangles of equal width

What is 11.375

100

Find the volume: The solid lies between planes perpendicular to the x-axis at x = -4 and x = 4. The cross sections perpendicular to the x-axis are circular disks whose diameters run from the parabola y = x² to the parabola y = 32 - x²

What is 16384/15 * π

200

Integrate ∫(2x-9 sin⁡x )dx

What is x^2 + 9cosx+C

200

Use the Fundamental Theorem of Calculus to evaluate ∫(4x^3-2x)dx on [-1,1].

What is 0

200

Integrate ∫[x(1-3x^2)^4]dx

What is (-1/30)(1-3x^2)^5 +C

200

Find the total area of the region between the y= 2x + 7 and the x-axis from x = 1 to x = 5.

What is 52

200

Find the volume of the solid generated by revolving the region bounded by the given lines and curves about the x-axis. y = √x, y = 0, x = 0, x = 9

What is V = 81/2 * π

300

Integrate ∫(t+e^t )dt

What is t^2/2+e^t+C

300

Use the Fundamental Theorem of Calculus to find the derivative of the integral d/dx∫(sin t) dt on [0,x^5]

5x^4 * sin(x^5)

300

Integrate ∫[(sinx)^3*cosx]dx

What is (1/4)(sinx)^4+C

300

Find the area of the total region enclosed by the curves f(x) = x³+x²-6x and g(x) = 6x

What is 937/12

300

Find the volume of the solid generated by revolving the region bounded by the curves about the x-axis. y = -6x + 12, y = 6x, x = 0

What is 72π

400

Integrate ∫(10/x) dx

What is 10ln|x| + C

400

Use the Fundamental Theorem of Calculus to evaluate ∫(3/x)dx on [1,6]

What is 3ln(6)

400

Integrate ∫[xe^(-3x^2)]dx

What is (-1/6)e^(-3x^2)+C

400

Find the area enclosed by the curves y = 2x - x² and y = 2x - 4

What is 32/3

400

Find the volume of the solid generated by revolving the region about the y-axis. The region in the first quadrant bounded on the left by y = x³, on the right by the line x = 4, and below by the x-axis.

What is 2048/5 * π

500

Integrate ∫[6(5^x) dx]

What is 6(5^x)/ln(5) + C

500

Use the Fundamental Theorem of Calculus to evaluate ∫x(x^2-6)dx on [-2,1]

What is 21/4

500

Integrate ∫[(x^2 + 16)^1/2]/(x^4) dx

What is −[(x^2+16)^(3/2)]/(48x^3)+C

500

Find the area enclosed by the curves y = x and y = x²

What is 1/6

500

The region shown is to be revolved about the x-axis to generate a solid. Which of the methods (disk/washer, shell) could you use to find the volume of the solid? How many integrals would be required in each case?

Washer+Disk (2 integrals), Shell (1 integral)