Calculus Topics Jeopardy Template

Derivatives

Motion

EVT/MVT

Implicit Differentiation

Related Rates

100

Find the derivative: y=3/(x^3)

-9x^-4

100

The position function of an object in motion is given by x(t)=t^3+2t^2-4t+3 meters in 0≤t≤4 seconds. In this interval: Find the acceleration at 3 seconds.

22 m/s^2

100

Find the values of c that satisfy the MVT for the given function and interval. f(x)=x^2+4 on the interval [1,2]

3/2

100

Find dy/dx: x^3-y^3=y

-3x^2 / -3y^2-1

100

A rock is dropped into a pond and creates a ripple that is moving out at a rate of 5cm/sec. At what rate is the area of the circle growing when the edge of the ripple is 10 cm away from where the rock was thrown?

100pi

200

Find the derivative y=1/√(x-3)

-1/2(x-3)^(-3/2)

200

The position function of an object in motion is given by x(t)=t^3+2t^2-4t+3 meters in 0≤t≤4 seconds. In this interval: is the speed increasing or decreasing at 2 seconds?

Increasing

200

What is the absolute minimum for the function f(x)=3x^2+5x-2 on the interval [-1,1]

-4.083

200

Find dy/dx: x^4+y^4=10

-4x^3 / 4y^3

200

A 10-foot long ladder is leaning against a vertical wall. The ladder is being pushed from the bottom horizontally toward the wall at a rate of 10ft/sec. How fast is the top of the ladder being pushed up the wall when the bottom of the ladder is 6 ft from the wall?

15/2

300

Find the slope of the line tangent to the curve y=(2x+2)^(3/2)

3/2(2x+2)^(1/2)*(2)

300

The position function of an object in motion is given by x(t)=t^3+2t^2-4t+3 meters in 0≤t≤4 seconds. In this interval: when does the object stop?

2/3 seconds

300

Find the values of c that satisfy the MVT for the given function and interval. f(x)=(6/x)-5 on the interval [-3,2]

MVT Does not apply

300

Find dy/dx: y^2+2y=4x^2+2x

8x+2 / 2y+2

300

A spherical balloon is being inflated so that its volume is increasing at a rate of 36π in^3/sec. How fast is the radius of the balloon increasing when the diameter is 8 inches?

9/16

400

Find the slope of the line tangent to the curve f(x)=4x^3-2x^2+3 at the point (1,5)

400

The position function of an object in motion is given by x(t)=t^3+2t^2-4t+3 meters in 0≤t≤4 seconds. In this interval: What is it's displacement?

80 m

400

What is the absolute minimum for the function f(x)= x^2-4 on the interval [-3,-1]?

-3

400

Find dy/dx: x^3-5xy=3x+5y

-3x^2 +5y+3 / -5x-5

400

Oil is running into an inverted conical tank at a rate of 4π m^3/min. If the tank has a radius of 6 meters at the top and a depth of 8 meters, how fast is the depth of the oil changing when it is 4 meters?

4/9

500

Find the equation of the line tangent to the curve y=√(x^2+3x) at x=1

y-2=5/4(x-1)

500

The position function of an object in motion is given by x(t)=(4t^3)/3-10t^2+16t+2 meters in 0≤t≤5 seconds. In this interval: what is the average velocity?

-2/3 m/s

500

Find the values of c that satisfy the MVT for the given function and interval. f(x)=(6/x)-5 on the interval [-3,-1]

-2

500

Find dy/dx: sinx-cosy=y^2-x^2

-cosx-2x / siny-2y

500

Water is being poured into a conical cup that is 6 cm high and has a diameter of 6cm at the top of the cup. Right now there is a height of 5cm of water in the cup. If the water is pouring into the cup at a rate of 2 cm^3/s, what is the rate at which the height of the water is changing?

8/25π