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2020春高数下试题2(回忆版)

1.Determine whether the following statements are true or false? No justification is necessary

(1) Parametric curves $x (t) = \cos t, y (t) = \sin t$ and $x (t) = \sin t, y (t) = \cos t$ have the same graph

(2) If $x (t) = f (t)$ and $y (t) = g (t)$ are twice differentiable, then

\frac{d^{2} x}{d x^{3}} = \frac{d^{2} y (t) / d t^{2}}{d^{2} g (t) d t^{2}}

2.Multiple Choice Questions: (only one correct answer for each of the following questions.)

(1) If $| u | = 2, | v | = \sqrt{2}$ , and $u \cdot v = 2$ , then $| u \times v |$ is

(A) 2

(B) $2 \sqrt{2}$

(D) 1

(2) How many points of interesection do the curves $r = \frac{1}{2}$ and $r = \cos 2 θ$ have?

(A) 2

(B) 4

(D) 8

(3) If $f (x + y, x - y) = x^{2} - y^{2}$ , then $\frac{\partial f (x, y)}{\partial x} + \frac{\partial f (x, y)}{\partial y} =$

(A) $2 x - 2 y$

(B) $2 x + 2 y$

(D) $x + y$

3.Please fill in the blank for the questions below

(1) If the plane $3 x + λ y - 3 z + 16 = 0$ is tangent to the surface $3 x^{2} + y^{2} + z^{2} = 16$ , then $λ =$ $\underset{―}{}$

(2) Let $z = \ln \sqrt{x^{2} + y^{2}} + \tan^{- 1} \frac{x + y}{x - y}$ , then $d z =$ $\underset{―}{}$

(3) The distance from the point $P (1, 4, 0)$ to the plane through $A (0, 0, 0), B (2, 0, 1)$ and $C (2, - 1, 0)$ is $\underset{―}{}$

(4) A closed path $C$ consists of three curves:

\begin{array}{ll} C_{1} = r (t) = (\cos t) i + (\sin t) j + t k, & 0 ⩽ t ⩽ \frac{π}{2} \\ C_{2} = r (t) = i + (\frac{π}{2}) (1 - t) k, & ⩽ t ⩽ 1 \\ C_{3} = r (t) = t i + (1 - t) j, & 0 ⩽ t ⩽ 1 \end{array}

Then the circulation of $F = 2 x i + 2 z j + 2 y k$ around path $C$

traversed in the direction of increasing is $\underset{―}{}$

4.Determine the length of polar curve $r = \sin^{3} (\frac{θ}{3}), 0 ⩽ θ ⩽ \frac{π}{4}$

5.Given a curve $r (t) = (\cos^{3} t, \sin^{3} t, 0), 0 < t < \frac{π}{2}$ in $R^{3}$ , find its curvature and principal unit normal

6.The sequence ${a_{n}}$ is defined by $a_{2 k - 1} = \frac{1}{k}, a_{2 k} = - \frac{1}{k + 2}$ ( $k$ can be any positive integer).Is the series $\sum_{n = 1} \infty a_{n}$ convergent or divergent? Prove your conclusion

7.Find the Maclaurin series for $f (x) = \frac{1}{(1 + x)^{3}}$

8.Find the absolute maximum and minimum values of $f (x, y) = 4 x y^{2} - x^{2} y^{2} - x y^{3}$ on the close triangular region in the $x y$ -plane with verties $(0, 0), (0, 6)$ and $(6, 0)$

9.Find the centroid of the solid bounded above by the surface $z = \sqrt{r}$ , on the sides by the cylinder $r = 4$ , and below by the $x y$ -plane

Use the Stokes' Theorem to compute the surface integral $\iint_{s} \nabla \times F \cdot n d o$ , here $F = x z$ it $y z j + x y k$ , and $S$ is the part of the surface sphere $x^{2} + y^{2} + z^{2} = 4$ that lies inside the cylinder $x^{2} + y^{2} = 1$ and above the $x y$ -plane (the boundary is counterclockwise when viewed from above
Use the Divergence Theorem to find the outward flux of $F$ across the boundary of the region $D$ , here $F = x y i + (y^{2} + e^{x z^{2}}) j + \sin (x y) k$ ; and $D$ is the region bounded by the parabolic cylinder $z = 1 - x^{2}$ , and the planes $z = 0, y = 0$ , and $y + z = 2$