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Unformatted text preview: MATH 313 Midterm # 1 Spring 2010
April 26, 2010 Instructor: Gr Wei 1. 2. 3. 4, ,,,,,,, ,. 5, ....... .. . Y w [/W 70%
Print Your Perm Number Name Circle your TA’S name and Discussion time: Brent Albrecht R 8am ; 5pm; 6pm; 7pm Lacey Huebel T 8am ; 5pm; 6pm; 7pm Grace Kennedy T Bern; 4pm; 5pm; 6pm; Books, notes are NOT allowed. No calculators are allowed, READ the prob—
lems carefully. Put ﬁnal answers in the boxes on this page. Put high quality
work in the blue book for all answers. At the end of exam STAPLE this page
to the INSIDE front blue cover of the blue book, so that the front side faces the
white writing pages of the blue book; staple only once at the upper left corner
(one bonus point for doing this the correct way). 1. (16 pts) Find the derivative of the function.
( x m cos(s2 , (n = $5M. awn )ds ()f()
(anew MAI—j (we): €“X. .... 6 7M)
. 36 ) pts Evaluate the following integrals 2 (
t” “'3
(C) l [ ) 3‘ (16 pts) A particle moves along a iine with velocity function v(t) = t2 — 275, Where 'v is
measured in meters per second Find (a) the displacement and (h) the distance traveled by
the particle during the time interval [0, 5]. ( 4‘. 16 pts) Find the area enclosed by the line y=x and the parabola :92 m 12 —— x ( 5. 16 pts) Find the volume of the solid obtained by rotating the region bounded by
'y m 3:5, y m 3:2 about the y—axis. V=il F
L W ‘
W M ' i M
y g (LIX XVI".1 l2,
‘1 "X ...
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 RickRugangYe

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