MATH 246 Midterm: Exam 1 No Solutions Summer 2006

Exercises and Problems for Section 17.1 18. A ie segment hetween (2, 1,3) and (4.3,2 he plane 5 20. A line perpendicular to the plane --y+7 and through the point (1,1,6) 21. The circle of fabus 2 inthe 'y-plane, centered the on- gin, clockwise. 22. The ciecle of radis 2 parallel to the ry-plane, centered the point (0,0, 1), and traversed countenclockwise when viewed from below 23. The circle of radius 2 in the za-plane, cenered at the ori- gin. 24. The circle of radias 3 parallel to the ry-plane, centered at the point (0,0,2) 25. The circle of redius 3 in the ya-plane, centered a the point (0,0,2) 26. The circle of radius 5 parallel to the ya-plane, centered at the poinn (-1,0,-2) 28. The curve y - 27. The curve zy in the zy-plane zy-plane. in the 29, The curveエーー3? in the za-plane. 30.The curve in which the plane 1, 2 cuts the surface -2 z 31. The curve y-4-5' through the point (0,4,4), par. allel to the ry-plane. the line. 32. The elipse of major diameter 5 parallel to the y-axis la Exercises 7-17, find parametric equations for 7. The line in the direction of the vector - and through and minor diameter 2 parallel to the z-axis, centered at the point (0, 1,0). &. The line in the direction of the vector ? +2 33. The ellipse of major diameter 6 along the z-axis and mi- and or diameter 4 along the y-axis, centered at the origin. through the point (3, 0,-4). 9. The line 34·The ellipse of major diameter 3 parallel to the z-axis The line in the direction of the vector 53 + 2k and In Exercises 35-42, find a parametric equation for the curve dhrough the point (5,-1,1) segment. (There are many possible answers.) 36. Line from凡= (-1,-3) to h-(5,2). 38. Semicircle from (0,0,5) to (0,0,-5) in the yz-plane The line in the direction of the vector 37 -3 +E and 35. Line from (-1,2,-3) to (2,2,2). through the point (1,2,3). 12. The line in the direction of the vector ai +2j-3k and 37. Line from P(1,-3,2 to P (4.1.-3). 13. The line through (-3,-2,1) and (-1,-3, -1) through the point (-3,4, -2) with y 2 0. The line through the points (1,5,2) and (5,0,-1).39. Semicircle from (1,0,0) to (-1,0,0) in the zy-plane 5. The line through the points (2,3, -1) and (5,2,0) with y 2 0. 40. Graph of y VE from (1,1) to (16,4). 41. Are of a circle of radius 5 from P=(0,0) to Q IS The line through (3-2,2)and intersecting the y axis at v 2 (10,0). 庂The line intersecting the z-axis at z = 3 and the z-axis 42. Quarter-ellipse from (4,0 3) to (0 -3,3) in the plane

1. 0/6 points LarCalc11 13.1.010. [3864 VIA Evaluate the function at the given values of the independent variables. Simplify the results. fx, y) -4 -x2 - 4y2 (a) ro, 0) for (c) f2, 3) (e) x, o Cal 2. 0/2 points LarCalc11 13.1.019.MI. [386 Evaluate the function at the given values of the independent variables. Simplify the results. x, y)- 6x y2 (a) fix + ax, y)-f(x, y) Ay

3. 1 points LarCalc11 13.2 Find the indicated limit by using the limits limfx, y) 2 and im g(x, y)--4 lim 4. O/1 points LarCalci1 13 2 Find the indicated limit by using the limits lim x, y) 3 and lim (x, y) g(x, y)--5 (a, b) lim x, Y) (x, y) (a, b) g(x, y) 5. y1 points LarCalc11 13.3 Explain whether or not the Quotient Rule should be used to find the partial derivative. Do not differentiate. ay x2 51 O Yes, the function is a quotient. O No, y only occurs in the numerator. 6. 0/2 points LarCalc11 13.3 Find both first partial derivatives oz 7. 0/2 points LarCalc11 13.3 Find both first partial derivatives. hx, y) ex+y) h(x, y)

8. /2 points LarCalc11 13.3.031 Find both first partial derivatives. az dx az ay 9. /1 points LarCalc11 13.4.003. Find the total differential. z 3xSy10 dz 10. 0/2 points LarCalc11 13.5.012 Consider the following. (a) Find dw/dt using the appropriate Chain Rule. dw dt (b) Find dw/dt by converting w to a function of t before differentiating. dw dt 11. 0/1 points LarCalc11 13.6.008. Find the directional derivative of the function at P in the direction of v. rx, y) = x3-y3, Rio, 9), v-V2 (1+j)

12. 0/2 points LarCalc11 13.7.017 (a) Find an equation of the tangent plane to the surface at the given point. x+y+z=9, (2, 5, 2) (b) Find a set of symmetric equations for the normal line to the surface at the given point. ox -2y -5-z-2 13. /3 points LarCalc11 13.8.025 Use a computer algebra system to graph the surface and locate any relative extrema and saddle points. (If an an not exist, enter DNE.) -8x x2 y21 relative minimum (x, y, z) - relative maximum (x, y, z) saddle point 14. 0/1 points LarCalci1 13.10.027 Use Lagrange multipliers to find the minimum distance from the curve or surface to the indicated point. Surface Point Plane: x yz 1 (7,1,1)

be parametric esjuations for a tb) C i v i) C intersects esactly one e ine containing the point -1.3. intersects the xy and ntion voctor to find another esqua ne line with the Korm 17) Let C be the line the ine eontaining the point a) Give parametric ejuastions for c (b) Write an equation for C in on vector to find another equa for the same 18. Let C be the line deterimined by the tt (a) Provide a vector b) Give parametricequations fore c 19. Let C be the line determined by the the points where the line + bt.to t et) eplanes. Ia-0, esplain (a) Provide a vector (b) Write an equation for C in s, determine wbether the the distance between the c. 20. We wish to find the distance from C as shown in the figure that fo dinates of points P and Pa, but we do dinates of point Q (a) Ifyuknew the measure of angle θ llows Wek sect, find the point of intent know th- t.5-3,6+7. weould find the distance from point P to lanes r2()3-,4+3t,5-2 Applications ne. Explain why the vation in Washington State. She tonic wastes in one of the tank tank farm is huge, and she d is leaking. Worse yet, the tank g the tanks would req tank farm, an operation that Instead, Emmy has wells dug the tank farm, to try to trace the earth's surface is conside the bottom of the tank farm the distance is given in f taminated groundwater at (1033, 247,-55). If the w of one of the tanks and i what is the location of th the line does not ow you can distance from point P to line C even if you do ne know the measure of angle θ. line containing use the tech- ization for the 24. P023.5), ds(23.5) 25,Pi-1, 3, 7. d = (2,0,4) the leak? eyuivalent.6. Ptbc 53. lan is climbing Mountl He has made a secon mountain. He does n 27, P3, 1), d= (2 5) 28, p(1.3,-2, 4), d= (4,-1,5, 8) In Exercises 29-34, find an equation of the line containing the Proofs ntaning the given pair of points. Express your answer (a) as a vector p ess your an- rametrization, (b) in terms of parametric equations,and ( n 54. Let Ci and C be line symmetric form. 29. P(O,0,0), Q(4,-1,6) and P2 and Qa poin C2 if and only if P ③P(3,-1,7), Q(5,8,-2)