Calc BC exam
∫(x/2)(e^-3x/4)
((-2x/3)e^-3x/4) + ((3/8)e^-3x/4) + c
If f(x)= (5-x)/(x^3+2) f'(x)=
(2x^3-15x^2-2)/(x^3+2)^2
∫1/t√t dt=
-2t^(-1/2) + c
Which of the following is the interval of convergence for the series E (x+2)^n/2^n
-4<x<0
Let H(x) be an antiderivative of x^3+sinx / x^2+2 If H(5)=π H(2)=
-5.867
The graph of the function f is shown above If g is the function defined by g(x)= ~2 x f(t) what is the value of g(10) times g'(10)
-5/2
If f(x)=cos^2(3x-5) f'(x)=
-6sin(3x-5)cos(3x-5)
Let S be the region in the first quadrant bounded above(#89) by the graph of the polar curve r=cos(theta) and bounded below by the graph of the polar curve r=2theta The two curves intersect when theta=0.450 What is the area of S?
0.243
The velocity vector of a particle moving in the xy-plane has components dx/dt= sin(t^2) dy/dt= e^cost At time t=4, the position of the particle is (2,1). What is the y-coordinate of the position vector at time t=3?
0.590
The graph of a function f, consisting of three line segments, is shown above(#79) The function f is defined on the closed interval [0,6] Let g(x)= ~2 x f(t) What is the maximum value of g(x) for 0<x<6?
1
Which of the following is a power series expansion of e^x+e^-x/2?
1 - x^2/2! + x^4/4! - x^6/6! + ... + ((-1)^n x^2n)/(2n!)
A particle moves in the xy-plane so that its position for t>= is given by the parametric equations x=ln(t+1) and y=kt^2, where k is a positive constant. The line tangent to the particle's path at the point where t=3 has slope 8. What is the value of k?
1/3
A cube with edges of length x centimeters has volume V(x)=x^3 cubic centimeters. The volume is increasing at a constant rate of 40 cubic centimeters per minute. At the instant when x=2, what is the rate of change of x, in centimeters per minute, with respect to time?
10/3
∫0 5 √((5-x)/5)
10/3
Let y=f(x) be the solution to the differential equation dy/dx= x-y with initial condition f(2)=8. What is the approximation for f(3) obtained by using Euyler's method with two steps of equal length, starting at x=2?
15/4
The position of an object moving along a path in the xy-plane is given by the parametric equations x(t)=5sin(pit) y(t)=(2t-1)^2 The speed of the particle at time t=0 is
16.209
The table above(#21) gives the level of a person's cholesterol at different times during a 10-week treatment period. What is the average level over this 10-week period obtained by using a trapezoidal approximation with the subintervals [0,2] [2,6] [6,10]?
193
The slope of the line tangent to the graph of y=xe^x at x=ln2 is
2ln2 + 2
If f(x)= E x^2n/n! f'(x)=
2x + 2x^3 + x^5 + x^7/3 + ... + 2nx^2n-1/n!
If g is a twice-differentiable function, where g(1)=0.5 and lim as x->infinite g(x)=4 then ∫1 ∞ g'(x)=
3.5
If x^2+xy-3y=3, then at the point (2,1) dy/dx=
5
The number of students in a cafeteria is modeled by the function P that satisfies the logistic differential equation dP/dt= 1/2000P(200-P), where t is the time in seconds and P(0)=25. What is the greatest rate of change, in students per second, of the number of students in the cafeteria?
5
~(3x+1)/(x^2-4x+3)=
5ln[x-3] - 2ln[x-1] + c
If the infinite series S= E (-1)^n+1 (2/n) is approximated by Pk= E (-1)^n+1 (2/n) What is the least value of k for which the alternating series error bound guarantees that [S-Pk}= 3/100
68
If ∫4 -10 g(x)=-3 and ∫4 6 g(x)=5 then ∫-10 6 g(x)=
8
If the average value of a continuous function f on the interval [-2,4] is 12 what is ∫-2 4 f(x)/8
9
Which of the following are equal to -1? I. lim x->0- [x]/x II. lim x->3 (x^2-7x+12)/(3-x) III. lim x->infinite (1-x)/(1+x)
I and III only
Which of the following statement about the series E 1/2^n-n is true?
The series converges by the limit comparison to the geometric series E 1/2^n
The twice differentiable functions f, g and h have second derivatives given above(#86) Which of the functions f, g and h have a graph with exactly two points of inflection?
f and g only
Let f be a twice-differentiable function for all real numbers x. Which of the following additional properties guarantees that f has a relative minimum at x=c?
f'(c)=0 and f"(c)>0
The derivative of the function f is given by f'(x)=e^-xcos(x^2) What is the minimum value of f(x) for -1<x<1
f(-1)
What is the radius of convergence of the Maclaurin series for 2x/1+x^2?
infinite
If f(x)=3x^2+2x f'(x)=
lim as h->0 (3(x+h)^2+2(x+h))-(3x^2+2x) / h
The continuous function f is positive and has domain x>0. If the asymptotes of the graph of f are x=0 and y=2 Which of the following statements must be true?
lim as x->0+ f(x)= ∞ and lim as x->∞ f(x)=2
Look at graphs for #15. Which statement is false?
lim as x->1 (f(x)g(x+1)) does not exist
Look at graph on #6 Which of the following is true?
lim as x->a of f(x) ≠ f(a)
Which of the following is a slope field for dy/dx= x^2+y^2?
look for graph where slope increases as y increases
The graph of the function f is shown above(#81) for -2<x<2 Which of the following could be the grapph of an antiderivative of f?
looks like wide and slightly wavy x^3 D
Let f be the function with f(0)=1/pi^2, f(2)=1/pi^2, and derivative given by f'(x)=(x+1)cos(pix). How many values of x in the open interval (0,2) satisfy the condition of the MVT for the function f on the closed interval [0,2]?
two
The function f is increasing on the interval [1,3] and nowhere else. The first derivative of f, f' is continuous for all real numbers. Which of the following could be a table of values for f'(x)?
x f'(x) 0 -1 1 1 2 2 3 1 4 -2
The position of a particle moving in the xy-plane is given by the vector {4t^3,y(2t)}, where y is a twice-differeniable function of t. At time t=1/2, what is the acceleration vector of the particle?
{12,4y"(1)}
Let f be the function given by f(x)=2cosx+1. What is the approximation for f(1.5) found by using the line tangent to the graph of f at x=π/2?
π-2
To what number does the series E (-e/pi)^k converge?
π/(π+e)
The base of a solid is the region bounded by a portion of the graph of y=sin(pi/2x) and the x-axis, as shown in the figure above(#83) For the solid, each cross section perpendicular to the x-axis in a rectangle of height 3. Which of the following expectations gives the volume of the solid?
∫0 2 3sin(π/2x)
The length of the curve y=sin(3x) from x=0 to x=π/6 is given by
∫0 π/6 √1+9cos^2(3x)