AB MCQ Set 30 - PyQuiz

Question 1 of 22 | MCQ · Level 2

\(\operatorname*{lim}\limits_{x \rightarrow 3^-} \dfrac{|x - 3|}{3 - x} =\)

\(-\infty\)

\(-1\)

\(0\)

\(1\)

\(\infty\)

Question 2 of 22 | MCQ · Level 2

If \(f(2) = 7\) and \(f'(2) = -3\), then the equation of the tangent to the curve \(y = f(x)\) at \(x = 2\) is

\(y = -3 x + 13\)

\(y = -3 x + 23\)

\(y = x\)

\(y = 2 x - 17\)

\(y = 7 x - 17\)

Question 3 of 22 | MCQ · Level 2

On the interval \(1 < x < 2\), the curve \(y = x^3 - 6 x^2 + 9 x + 1\) is

increasing and concave up

increasing and concave down

decreasing and concave up

decreasing and concave down

horizontal

Question 4 of 22 | MCQ · Level 3

The minimum value of the function \(f(x) = \sqrt[3]{x^2 + 4 a x + 12 a^2}\), \(a > 0\), is

\(-2 a\)

\(\sqrt[3]{6 a^2}\)

\(2 \sqrt[3]{a^2}\)

\(2 a\)

none of the above

Question 5 of 22 | MCQ · Level 2

\(\operatorname*{lim}\limits_{x \rightarrow -\infty} \dfrac{10 - 2^x}{10 + 2^{-x}} =\)

\(-1\)

\(0\)

\(1\)

\(10\)

\(\infty\)

Question 6 of 22 | MCQ · Level 3

The x-coordinate of the point where the tangent to the parabola \(y = a x^2\) at \(x = p\) (not a vertex) intersects the x-axis is

\(\dfrac{p}{2}\)

\(\dfrac{p^2}{2}\)

\(\dfrac{a p}{2}\)

\(\dfrac{a p^2}{2}\)

\(\dfrac{a}{p^2}\)

Question 7 of 22 | MCQ · Level 2

The table below shows some of the values of two differentiable functions \(f\) and \(g\) and their derivatives. If \(h(x) = f(x) g(x)\), then \(h'(5) = \)

\(x\)	\(f(x)\)	\(g(x)\)	\(f'(x)\)	\(g'(x)\)
3	-3	6	-5	1
4	0	3	-3	9
5	3	-2	4	5

\(2\)

\(7\)

\(14\)

\(20\)

\(26\)

Question 8 of 22 | MCQ · Level 3

Using the values in the table from the previous problem (\(f(3)=-3\), \(f(4)=0\), \(f(5)=3\), \(g(3)=6\), \(g(4)=3\), \(g(5)=-2\), \(f'(3)=-5\), \(f'(4)=-3\), \(f'(5)=4\), \(g'(3)=1\), \(g'(4)=9\), \(g'(5)=5\)), if \(h(x) = f(g(x))\), then \(h'(4) =\)

\(-45\)

\(-27\)

\(-15\)

\(0\)

\(25\)

Question 9 of 22 | MCQ · Level 2

If \(f(x)\) is a continuous function and \(f(2) = 7\) and \(f'(2) = -3\), then \(f(2.01)\) is approximately

\(-6.03\)

\(6.92\)

\(6.97\)

\(7.01\)

\(7.03\)

Question 10 of 22 | MCQ · Level 4

Consider the curve \(y = 2 x^3 - 3(k + 1) x^2 + 6 k x\), \(k > 1\). On the interval \(1 < x < k\),

\(y'\) is positive, and \(y''\) is first positive, then negative

\(y'\) is positive, and \(y''\) is first negative, then positive

\(y'\) is negative, and \(y''\) is first positive, then negative

\(y'\) is negative, and \(y''\) is first negative, then positive

Neither the sign of \(y'\) nor the sign of \(y''\) can be determined without knowing the value of \(k\).

Question 11 of 22 | MCQ · Level 2

If \(f(x) = 2^x\) and \(2^{3.03} \approx 8.168\), which of the following is closest to \(f'(3)\)?

\(.168\)

\(.97\)

\(1\)

\(3\)

\(5.6\)

Question 12 of 22 | MCQ · Level 3

Pictured above (in source) is the graph of \(f'(x)\), which is positive on \((-4, 4)\) and reaches its maximum at \(x = 0\). For what values of \(x\) is the graph of \(f(x)\) concave down?

\(-2 < x < 2\)

\(x < -4\) or \(0 < x < 4\)

\(-4 < x < 4\)

all values of \(x\)

the graph of \(f(x)\) is always concave up

Question 13 of 22 | MCQ · Level 2

If \(g(1) = 3\), \(g'(1) = 4\), \(g(2) = 8\), and \(g'(2) = 3\), and \(f(x) = g^2(x)\), then \(f'(2) =\)

\(12\)

\(16\)

\(23\)

\(24\)

\(48\)

Question 14 of 22 | MCQ · Level 2

If \(\displaystyle\int_{0}^{4} f(x) d x = 10\), \(\displaystyle\int_{0}^{5} f(x) d x = 9\), and \(\displaystyle\int_{4}^{7} f(x) d x = 1\), then \(\displaystyle\int_{5}^{7} f(x) d x =\)

\(-1\)

\(1\)

\(2\)

\(3\)

\(4\)

Question 15 of 22 | MCQ · Level 3

If \(u = x^2 + 1\), then \(\displaystyle\int_{1}^{2} \dfrac{x^2}{x^2 + 1} d x =\)

\(\displaystyle\int_{1}^{2} \dfrac{u - 1}{u} d u\)

\(\displaystyle\int_{1}^{2} \dfrac{\sqrt{u - 1}}{u} d u\)

\(\displaystyle\int_{2}^{5} \dfrac{u - 1}{u} d u\)

\(\displaystyle\int_{2}^{5} \dfrac{\sqrt{u - 1}}{u} d u\)

\(\displaystyle\int_{2}^{5} \dfrac{\sqrt{u - 1}}{2 u} d u\)

Question 16 of 22 | MCQ · Level 3

The average area of all circles with radii between 3 and 6 is

\(\dfrac{25 \pi}{2}\)

\(\dfrac{27 \pi}{2}\)

\(18 \pi\)

\(21 \pi\)

\(\dfrac{45 \pi}{2}\)

Question 17 of 22 | MCQ · Level 3

A rumor spreads continuously at the rate of \(3 t^2 + 6 t\) (where \(t\) is measured in days). How many people hear the rumor on the third day?

\(21\)

\(34\)

\(44\)

\(45\)

\(54\)

Question 18 of 22 | MCQ · Level 3

If \(\operatorname*{lim}\limits_{x \rightarrow 2}[\ln f(x)] = 1\), then \(\operatorname*{lim}\limits_{x \rightarrow 2} f(x) =\)

\(0\)

\(\ln 2\)

\(1\)

\(2\)

\(e\)

Question 19 of 22 | MCQ · Level 4

The graph of \(y = f''(x)\) consists of two straight line segments. It passes through \((0, 3)\), \((3, 0)\), \((6, -3)\), \((9, 0)\). If \(f'(0) = 0\), then in the vicinity of which of the following values of \(x\) is the curve \(y = f(x)\) falling and concave down?

\(2\)

\(4\)

\(6\)

\(8\)

\(10\)

Question 20 of 22 | MCQ · Level 3

If \(f(x) = \sin 2 x \cos 3 x\) and \(k\) is an odd integer, then \(f'(k \pi) =\)

\(-5\)

\(-2\)

\(-1\)

\(1\)

\(5\)

Question 21 of 22 | MCQ · Level 3

If \(F(x) = \displaystyle\int_{1}^{x} \dfrac{4}{1 + \ln t} d t\), then \(F'(e) =\)

\(\dfrac{1}{e^2}\)

\(\ln 2\)

\(2\)

\(2 e\)

\(e^2\)

Question 22 of 22 | MCQ · Level 3

If the slope of the tangent to the curve at any point \((x, y)\) on the curve equals \(\dfrac{x}{y}\), what kind of curve can it be?

a circle

a parabola

an ellipse

a hyperbola

none of the above

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