Indefinite Integrals
∫2sec2(x)dx=?
2tan(x)+C
∫162 dx=?
10
Evaluate ∫0π/2cos2x dx=?
π/4
∫4sin(x)/(3+cos(x)) dx=?
−4 ln(3+cos (x))+C
As a particle moves along the number line, its position at time t is s(t), its velocity is v(t), and its acceleration is a(t)= 1.
If v(3) = -3 and s(2) = -10, what is s(4)?
-16
∫4sin(x)dx=?
−4cos(x)+C
∫02(4x3−3x2+2x)dx=?
12
∫tan3xdx=?
tan2x/2−ln∣secx∣+C
∫(x2)/(x3+4) dx=?
1/3ln∣x3+4∣+C
As a particle moves along the number line, its position at time t is s(t, its velocity is v(t) and its acceleration is a(t)=-cost. If v(π) = 2 and s(π/2)=-3π, what is s(0)?
1+2π
∫(−3ex+x4)dx=?
−3ex+4ln∣x∣+C
∫−11(12*3sqrt(x))dx=?
0
∫sin2xcos3xdx=?
(sin3x/3)−(sin5x/5)+C
∫(2x+7)3 dx=?
(2x+7)4/8+C
A particle with velocity v(t)=t2+3, where t is time in seconds, moves in a straight line.
How far does the particle move from t=2 to t=3 seconds?
28/3 units
∫(−3/x+3ex)dx=?
−3ln∣x∣+3ex+C
∫014 10exdx=?
10e14−10
∫sin4xdx=?
1/4(3/2x−sin2x+1/8sin4x)+C
∫(2x−5)10 dx=?
(2x−5)11/22+C
The velocity of a particle moving along the x-axis is v(t)= 1/sqrt(t). At t=4, its position is 2.
What is the position of the particle, s(t), at any time t?
s(t)=2t1/2−2
∫5csc2(x)dx=?
−5cot(x)+C
∫25(12−x3/x4)dx=?
ln(5/2)−117/250
∫0π/23cos3xdx=?
2
∫(x)/sqrt(16-x2) dx=?
−sqrt(16−x2)+C
The velocity of a particle moving along the x-axis is v(t)=t2+t. At t=1 its position is 1.
What is the position of the particle, s(t), at any time t?
s(t)=1/3t3+1/2t2+1/6