Unit 1
Find the limit:
lim (x2 - 16) / (x - 4)
x --> 4
8
Differentiate g(x)=e1−cos(x)
g'(x)= e1−cos(x)(sin(x))
The slope of the curve y3 - xy2 = 4 at the point where y = 2 is...
1/2
A particle moves along the x-axis. The function x(t)=t3 - 3t2 + 7t - 6 gives the particle's position at any time t≥0. What is the particle's acceleration a(t), at t=3?
12
Find the absolute extreme of the function f(x) = x3 - (3/2)x2 on the given interval [-1, 2]
Absolute minimum: (-1, -(5/2))
Absolute maximum: (2, 2)
Find the limit:
Lim (√x - 2) / (x - 4)
x --> 4
1/4
Differentiate y= (sin(3x)) / (1+x2)
y' = ((1 + x2)(3(cos(3x)) - (sin(3x))(2x)) / (1 + x4)
find dy/dx by implicit differentiation x2 - 5xy + 3y2 = 7
dy/dx = (-2x + 5y) / (-5 + 6y)
The maximum acceleration attained on the interval o<t<3 by a particle whose velocity is given by v(t) = t3 - 3t2 + 12t + 4 is...
21
Identify the open intervals on which the function y = x - 2cos(x) (between 0 and 2 pi) is increasing or decreasing
Increasing: (0, (7pi/6)) and ((11pi/6), 2pi)
Decreasing: ((7pi/6), (11pi/6))
Find the limit
lim (x + 3) / (√9x2 - 5x)
x --> infinity
1/2
Find the tangent line to the graph of f(x) = (x3 + 4x- 1)(x - 2) at the point (1, -4)
y + 4 = -3(x - 1)
find dy/dx by implicit differentiation: ecos(x) + esin(y) = 1/4
dy/dx = (sin(x))(ecos(x))) / (cos(y))(esin(y)))
Evaluate the limit
lim (x3 - 8) / (x2 - 4)
x --> 2
3
Determine all the number(s) c which satisfy the conclusion of Mean Value Theorem for A(t)=8t+e−3t on [−2,3]
(calculator)
C = -1.097
What are the horizontal asymptotes of the graph of
y = (3 + 4x) / (1 - 4x) ?
-1
Find the tangent line to the graph of y = lnx3 at the point (1,0)
y = 3x - 3
The radius of a cylinder is increasing at a rate of 1 meter per hour, and the height of the cylinder is decreasing at a rate of 4 meters per hour. At a certain instant, the base radius is 5 meters and the height is 8 meters. What is the rate of change of the volume of the cylinder at the instant?
-20pi meters3/hour
Evaluate the limit
lim (sqrt(2 + x) - 2) / (x - 2)
x --> 2
1/4
The function f has a first derivative given by f'(x) = x(x-3)2(x+1). At what values of x does f have a relative maximum?
F has a relative max at x = -1