Calculus Jeopardy!

UNIT 1 & 2

UNIT 3 & 4

UNIT 5 & 6

UNIT 7 & 8

100

f(x)=

{ x²−1 if x<2

{3x-5 if x≥2

What does the limit equals at x=2?

A) 3

B) 1

C) 2

D) does not exist

What is does not exist, therefore not continuous

100

If the velocity of an object is increasing, this means the acceleration is ____ and the object is _____ over time.

A) positive, speeding up

B)negative, slowing down

C)negative, speeding up

D) positive, slowing down

What is option A) positive, speeding up

100

Let g be a twice-differentiable, increasing function of t. If g(0)=20 and g(10)=220, what must be true on the interval 0<t<10?

A) g'(t)=0 for some t in the interval

B) g'(t)=20 for some t in the interval

C) g''(t)=0 for some t in the interval

D) g''(t)>0 for all t in the interval

What is B) g'(t)=20 for some t in the interval

100

Which of the following is a solution to the differential equation 𝑥𝑦′−3𝑦=6 ?

A) y=x²+2

B) y=3x² - 2

C) y=5x³-2

D) y=7x³+2

What is option C, y=5x³-2?

200

Find the derivative of f(x)=3x²+7x-2 using the limit process.

A) 6x+7

B) 5x+3

C) 2x+1

D) 7x+6

What is 6x+7

200

As the limit approaches 0, what is the answer to the equation 1+sec^2(x)/cos(x)=

A) 0

B) 1

C) 2

D) 4

What is option C) 2

200

f(x) = 2x³-3x²-36x+2

Find the point of inflection(s)?

What is x = 1/2

200

The amount of bacteria in a petri dish increases at a rate proportional to the amount present. At time 𝑡=0, the amount of bacteria in the dish is 10 grams. At time 𝑡=2, the amount of bacteria in the dish is 30 grams. What is the amount of bacteria in the dish at time 𝑡=6 ?

A) 70 grams

B) 190 grams

C) 270 grams

D) 9270 grams

What is option C, 270 grams?

300

The limit of x approaching infinity is the square root of (9x⁴+1) / (x²-3x+5) =

A) 1

B) 3

C) 9

D) nonexistent

What is 3

300

If f(x)= sin2(2x+3), then f'(x)=

A) 4sin(2x+3)

B)2cos2(2x+3)

C)2sin(2x+3)cos(2x+3)

D)4sin(2x+3)cos(2x+3)

What is option D)4sin(2x+3)cos(2x+3)

300

The limit as n approaches infinity of the sum from k=1 to n of the quantity: the fourth root of 2+3k/n, multiplied by 3/n. Write this as a definite integral.

What is the integral from 2 to 5 of the fourth root of x dx.

300

Which of the following is the solution to the differential equation 𝑑𝑃𝑑𝑡+𝑃=10 with the initial condition 𝑃(0)=4 ?

A) P=-1+ the squareroot of (20t+25)

B) P=5-e^-t

C) P=10- 6e^-t

D) P=10-6e^t

What is option C, P=10-6e^-t?

400

f(x) = { 2x-2 for x<3

{ 2x-4 for x>=3

For this piecewise function, which of the following is true?

I. lim (h->0^-) (f(3+h)-f(3))/h =2

II. lim (h->0^+) (f(3+h)-f(3))/h = 2

III. f'(3)=2

A) none

B) II only

C) I and II only

D) I, II, III

What is II only

400

f(x)= x²g(h(x)) where g(5)=3, g'(5)=-2, h(2)=5, and h'(2)=4. FIND f'(2).

A)-32

B)-20

C)0

D)4

What is option B) -20

400

Which of the following is equivalent to the integral of cos(4x)sin⁵(4x)dx?

A) ¼ integral cos udu multiplied by ¼ integral sin⁵udu, where u=4x

B) Integral cos(4x)dx multiplied by integral sin⁵(4x) dx

C) ¼ integral u⁵ du, where u=sin(4x)

D) Integral u⁵ du, where u=sin(4x)

What is C) ¼ integral u⁵ du, where u=sin(4x)

400

This integral represents the area between the curves y=sinx and y=cosx on the interval where cosx is greater than or equal too sinx:

What is the integral of (cosx-sinx) on the interval (0,pi/4)?

500

f(x) = x³sin(ln(x²+1))

f'(x) =

A) 3x²*sin(ln(x²+1))+(2x³/x²+1)*cos(ln(x²+1))

B) 3x²*sin(ln(x²+1))+(2x⁴/x²+1)*cos(ln(x²+1))

C) 3x²*sin(ln(x²+1))+(2x⁴/x²+1)*sin(ln(x²+1))

D) 3x²*sin(ln(x²+1))+(2x³/x²+1)*sin(ln(x²+1))

What is 3x²*sin(ln(x²+1))+(2x⁴/x²+1)*cos(ln(x²+1))

500

The edge of a cube is increasing at a rate of 0.2 inches per second. At the instant when the total surface area becomes 150 square inches, what is the rate of increase, in cubic inches per second, of the volume of the cube?

A)5

B)10

C)15

D)20

What is C) 15

500

A particle moves along a straight line with its velocity at time t, given by V(t)=t²-4t+3, where v(t) is measured in meters per second and t is measured in seconds for 0<=t<=5. The particle starts at s(0)=7 meters at t=0.

Determine the time intervals during which the particle is moving to the left and the right. Justify your answer.

Moving to the right between (0,1)U(3,5) because the velocity is positive.

Moving to the left between (1,3) because the velocity is negative.

500

A region is bounded by the curves y= sqrt of x, y=0, and x=4. Give the integral expression and then find the volume of the solid formed when this region is rotated about the line y=2.

What is pi times the integral of [(2)²-(2-sqrt of x)²]dx from b=4 and a=0? And what is (40pi)/3?