Integral Rules (Fall 2020) Jeopardy Template

Indefinite Integrals I

Indefinite Integrals II

Definite Integrals
(FTOC I)

FTOC I & II

Miscellaneous

100

int (1/3sinx-1/4cosx)dx

-1/3 cosx-1/4 sinx +C

100

int csc(t)cot(t)dt

-csc t+C

100

int_1^3r^-4 dr

[-1/3(3)^-3]-[-1/3(1)^-3]=26/81

100

Find the explicit area function represented by the following integral:

int_0^x2e^(3t)dt

A(x)=2/3e^(3x)

100

Estimate R₃ and L₃ over [0,1.5] for the function seen here.

L_3=0.5(5+2+1)

R_3=0.5(2+1+2)

200

int x^2 e^(x^3) dx

1/3e^(x^3)+C

200

int e^(9-2x)dx

-1/2e^(9-2x)+C

200

int_1^elnx/xdx

1/2

200

d/dx int_0^x(t^5-9t^3)dt

x^5-9x^3

200

Estimate distance traveled using R₆ and M₃ with the table below.

R_6=0.5(12+18+25+20+14+20)

M_3=1(12+25+14)

300

int 9^x sin(9^x) dx

-cos(9^x)/ln9

300

int t^2 sec^2(9t^3+1) dt

1/27 tan(9t^3+1)+C

300

int_0^3 dx/(x^2+9)

1/3(pi/4)-1/3(0)=pi/12

300

Let

A(x)=int_0^x f(t) dt

for f(x) seen in the image. Calculate A(2), A(3), A'(2), A'(3)

A(2)=4

A(3)=6.5

A'(2)=2

A'(3)=3

300

Solve the differential equation with the given initial condition:

dy/dt=3t^2+cos(t), y(0)=12

y=t^3+sin(t)+12

400

int dx/(xsqrt(ln(x))

2sqrt(ln x)+C

400

int 4^x-1/(x+1)dx

4^x/ln 4-ln|x+1|+C

400

int_1^sqrt(3) dx/(tan^-1(x)(1+x^2))

ln|pi/3|-ln|pi/4|

400

d/dx int_0^(x^2) (t dt)/(t + 1)

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

400

A population of insects increases at a rate of 200+10t+0.25t^2 insects per day (t is in days). Find the insect population after 3 days, assuming that there are 50 insects at t = 0.

697 insects

(not 698 b/c you must round down when dealing with population)

500

int (x dx)/sqrt(1-x^4)

1/2arcsin(x^2)+C

500

int sin(theta)cos(theta)e^(cos^2(theta) + 1) d theta

-1/2e^(cos^2(theta)+1)+C

500

int_(-1/2)^0((x+1)dx)/sqrt(1-x^2)

1-sqrt3/2+pi/6

500

Let

A(x)=int_0^x f(x) dx

where f(x) is depicted below. Identify the location of the local extrema, points of inflection of A(x), and intervals of increasing, decreasing, CC up, CC down. Also, identify the location of the absolute maximum of A(x).

Local max @ B
POI @ A, C, D
Abs. max @ B
INC: (0,B)
DEC: (B,D) and (D,E)
CC up: (0,A) and (C,D)
CC down: (A,C) and (D,E)

500

A particle moves in a straight line with velocity v(t)=12-4t (in m/s). Find the displacement and distance traveled over the time interval [0,5].

displacement = 10 meters

distance = 26 meters