Calculus Jeopardy Jeopardy Template

Unit 1

Unit 2

Unit 3

Unit 4

Unit 5

100

What is a limit?

What is a limit is the y value a function approaches from both the left and the right side of a given x value.

100

What is power rule?

what is nx^n-1.

100

What is chain rule?

what is f'(g(x)) x g'(x)

100

The number of gallons of water in a storage tank at time t, in minutes, is modeled by w(t). Interpret w'(10)=-8.

what is at 10 minutes, the amount of water is decreasing at a rate of 8 gallons per minute.

100

What is Mean Value Theorem?

What is if f is continuous [a,b] and differentiable on (a,b) then there exists a point c in (a,b) such f(c) = f(b)-f(a)/(b-a)

200

What is squeeze theorem?

What is a theorem that states if a function f(x) lies between two function g(x) and h(x) and the limits of each of g(x) and h(x) at a particular point are equal to L then the limit at that point is also equal to L.

200

What is the definition of the derivative?

What is this limit gives an expression that calculates the instantaneous rate of change (slope of the tangent line) of f(x) at any given x value.

200

Find the derivative of arctan?

What is 1/(x²+1)

200

Find the instantaneous velocity at any time t for s(t) = 1/3t³-3t²+8t-5

what is v(t)=t²-6t+8

200

Find the interval where f(x)=x³-12x+1 is increasing and decreasing.

What is decreasing (-2,2) because f'(x) < 0 and increasing on (-infinity,-2) and (2,infinity) because f'(x)>0

300

What is intermediate value theorem?

What is if f is continous (a,b) then f takes every value between f(a) and f(b).

300

What is the derivative of cos(x) - sin(x) + 5x²

What is -sinx - cosx + 10x.

300

Find the second derivative of f(x) = -3x³+4x^-2 at f"(1)

what is 6.

300

Limit as x approaches 0 of 4x/ln(x+1)

What is 4.

300

Find the relative extrema where x³-12x+1 using the first derivative test.

What is max @ x=-2 bc f' change sign from pos to neg and min @ x=2 bc f' changes sign from neg to pos

400

Solve using Squeeze theorem, limit as x approaches 0.

x² cos(1/x²)

What is 0.

400

Find the derivative of f(x)= 5x²-x

What is 10x-1

400

Solve y=1/(7x²-1)²

what is (-28x)/(7x²-1)³

400

The position, in meters, of a body at time t sec is s(t) is t³-6t²+9t. Find the body's acceleration each time the velocity is zero.

What is a(1)=-6 m/sec²and a(3)=6 m/sec²

400

Using Mean Value Theorem, find where the instantaneous rate of change is equivalent to the average rate of change for y =x²-5x+2 on (-4,-2).

_{What is x=-3}

500

Solve using IVT, (0,1), (3,5), (4,3),(8,7), (9,-1). On the interval 0<X<9 what is the minimum number of zeros?

What is 3.

500

Find the derivative of h(x) = (4x-1)/(3x+2)

what is 11/(3x+2)^2

500

Find the derivative of x³+y³=6xy.

What is dy/dx = (2y-x²)/(y²-2x)

500

At time t=4, the depth of snow is 28 centimeters. Use the line tangent to the graph of S at t=4 to approximate the depth of the snow at time t=6. Is the approximation an underestimate or an overestimate of the actual depth of snow at time t=6? Table: (0,1.8), (1,2.4), (4,2), (9,1.6), (12,1.3) of S'(t)

What is 32cm is an overestimate because s(t) is concave down.

500

Find the relative extrema of f(x)=5+3x²-x³ using the Second Derivative Test.

what is relative min at x=0 because f'(0)=0 and f''(0) > 0 and relative max at x=2 because f'(2) = 0 and f''(2) < 0