For the AB eam, students need to: determine antiderivatives of the basic functions calculate antiderivatives of functions using u-substitution use algebraic manipulation to rewrite the integrand prior to integrating use geometric interpretations of the definite integral
Complete this worksheet. These rules should be memorized. Basic Integration kf( udu ) [ f ( u) g( u)] du du n u du du u u a du u e du Inverse Trigonometric du a u du a u Trigonometric Functions: sin( udu ) cos( u) du sec ( udu ) csc ( udu ) sec( u) tan udu csc( u)cot udu Helpful to know: sin u tan( udu ) du cosu cosu cot( udu ) du sin u
Multiple Choice. (calculator not allowed) Y - 0 4 - X - The graph of a piecewise linear function f, for 4, is shown above. What is the value 4 of f d? (A) (B).5 4 5.5 8. (calculator not allowed) d (A) (B) ln C ln C C C C. (calculator not allowed) d 4 (A) (B) 4 4 4 ln 4 C C C ln 4 C arctan C
4. (calculator not allowed) e d = (A) (B) e e e e e e e e 5. (calculator not allowed) ( ) d = 0 (A) 0 (B) 6 5 7 5 6. (calculator not allowed) The graph of the piecewise linear function f is shown in the figure above. If g which of the following values is greatest? (A) g (B) g g 0 g g f t dt,
7. (calculator not allowed) sin( ) cos( ) d (A) cos( ) sin( ) C (B) cos( ) sin( ) C cos( ) sin( ) C cos( ) sin( ) C cos( ) sin( ) C 8. (calculator not allowed) cos d (A) sin C sin C sin C sin C 4 sin C 4 (B) 9. (calculator not allowed) 0 sin tdt (A) sin (B) cos cos cos cos
0. (calculator not allowed) dy If sin cos d and if y = 0 when, what is the value of y when = 0? (A) (B) 0. (calculator not allowed) If the substitution (A) (B) u du u 4 4 u du u u du u u du 4u u du u u is made, the integral 4 d. (calculator not allowed) k If ( k ) d 8, then k 0 (A) 9 (B) 9 8
. (calculator not allowed) What is the average value of y on the interval [0, ]? (A) 6 9 (B) 5 9 6 5 4 4. (calculator not allowed) b If f ( ) da b b, then ( ( ) 5) a f d a (A) a b 5 (B) 5b 5a 7b 4a 7b 5a 7b 6a 5. (calculator not allowed) If f is a linear function and 0 a b, then f ( ) d a (A) 0 (B) ab b a b a b
6. (calculator not allowed) What are all values of k for which (A) (B) 0 and, 0, and k d 0? 7, (calculator not allowed) (008 AB7) A particle moves along the -ais with velocity given by vt t 6tfor time t 0. If the particle is at position at time t 0, what is the position of the particle at time t? (A) 4 (B) 6 9 8. (calculator allowed) If f is a continuous function and if F( ) f( ) for all real numbers, then f ( ) d (A) F() F() (B) () F () F F(6) F() F(6) F() F(6) F() 9. (calculator allowed) On the graph of y f( ), the slope at any point (, y ) is twice the value of. If f (), what is the value of f ()? (A) 6 (B) 7 8 9 0
Free Response 0. (calculator not allowed) The figure above shows the graph of f, the derivative of a function f. The domain of f is the set of all such that 0. (a) Write an epression for f ( ) in terms of. (b) Given that f () 0, write an epression for f ( ) in terms of. (c) Sketch the graph of y f( ).
. (calculator not allowed) Let f be a differentiable function, defined for all real numbers, with the following properties. (i) f ( ) a b (ii) f () 6 and f () 8. (iii) f( ) d 8 (a) Find f ( ). Show your work.. (calculator not allowed) Let f ( ) 4 and g( ) k sin for k 0. k (a) Find the average value of f on [, 4]. (b) For what value of k will the average value of g on [0, ] k be equal to the average value of f on [, 4].
. Let g be a continuous function with g() 5. The graph of the piecewise-linear function g ', the derivative of g, is shown above for 7. (a) Find the absolute maimum value of g on the interval 7. Justify your answer. (b) Find the average rate of change of gon ( ) the interval 7.