Awesome Calc Jeapordy

DERIVATIVES

AREA/VOL/ETC

MISC.

GRAPHS

DEFINITIONS

100

FIND THE DERIVATIVE

f(x) = 4x³+10x⁴

f'(x) = 12x²+40x³

100

Find the average value of the function y= 3x²+4 on the interval [-1,2]

100

Radioactive Cricellium decays with the equation

A = A₀e^-0.7t where t is measured in years and A is measured in grams.

Find the half life of Cricellium.

.990 years

100

An equation of the line tangent to y= x³+3x²+2 at its point of inflection is...

y= -3x+1

100

In the definition of Riemann Sum, what does "n" represent (in terms of rectangles)

The number of rectangles

200

FIND THE DERIVATIVE

f(x) = -sin²(4x+1)

f'(x) = 8sin(4x+1)cos²(4x+1)

200

Evaluate the integral e^x+2dx from [3,7]

7954.671

200

Let k(x)= x²-5x+4

Find the AROC of k over the interval [3,5]

200

Given f''(x)= 3x²(x-4)⁵(x+3), what are the x coordinates of points of inflections for the graph of f(x)

x = -3

x = 4

200

Differentiability implies...

Continuity

300

FIND THE DERIVATIVE

f(x) = e^sin(x) + ln(x)

f'(x) = cos(x)e^sin(x)+(1/x)

300

The region bounded by y= 3x-x² and the x-axis is revolved about the line y= -2

What is the volume of the solid?

81.996

300

Find all x-values at which f(x)= (5x-1)/(25x²-4) is discontinuous

x= -2/5

x= 2/5

300

Find the absolute extrema of f(x)= 2x³-3x²-12x+5 on the interval -2<x<3

*can use calculator*

Max of 12 at x= -1

Min of -15 at x= 2

300

When is a function concave down?

When f'(x) is decreasing

When f''(x)<0

400

FIND THE ANTI-DERIVATIVE

f'(x) = 1/(x²+1)

f(x) = sin^-1+ c

400

Determine the area of the region bounded by

g(x) = 2x - sin(x) and the x-axis on the interval π<x<2π

3π²+2

400

Find the absolute extrema of f(x)= x³-12x+23 on the interval -5<x<3

Absolute min of -42 at x= -5

Absolute max of 39 at x= -2

400

Find the perimeter of the region in the first quadrant bounded by y= 16-x², the x-axis, and the y-axis

*may use calculator*

36.819

400

If a function is continuous on the interval [a,b] and differentiable on the same interval, what is gauranteed by the mean value theorom?

A number 'c' is gauranteed in the interval [a,b] such that f'(c)= (f(b)-f(a))/(b-a)

500

FIND THE H'(1)

g(x) = 3x²-2x

f(x) = x³

H(x) = g(f(x)) + g(x)

H'(x) = 16

500

A particle moves along a line so that its position at any time is given by the function x(t)= tan(t) where x(t) is measured in feet and t is measured in seconds.

Find the instantaneous velocity when t = 2π/3

4 ft/sec

500

A rocket blasts off with a constant acceleration of 40 ft/sec². After 2 seconds the rocket is 100 ft. high. Use antiderivatives to find an equation for the height of the rocket. (hint, the rocket is not moving at t=0 seconds)

h= -20t²+180

500

Consider f(y)= y²-8 and g(y)= 2y

Find the 2 points of intersection of the graphs f and g

(8,4) and (-4,-2)

500

Define the second part of the fundamental theorom of calculus

If a function f is continuous on [a,b] and F is any anti-derivative of f, then

S f(x) dx = F(b) - F(a)