y 6. 2 /3 4 5 -1 y *) -2 f(x) dx (d) f(x) dx (b) f(x) dx f(x) dx 5, (c) -2f(x) dx 0. f(x) dx (f)

Hi I need help answering only 6ac, and 12ac thank you.

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y = f(x) 1. What is "total signed area"? 7. 2. What is "displacement"? 1 2 3 4 3. What is sin x dx? (a) f) dx (d) 4x dx 4. Give a single definite integral that has the same value as (b) f(x) dx (e) (2х — 4) dx (2x + 3) dx + (2x + 3) de. (2х + 3) dx. (c) 2f(x) dx (f) (4х — 8) dx Problems y = x - 1 In Exercises 5-9, a graph of a function f(x) is given. Using the geometry of the graph, evaluate the definite integrals. 8. 1 2 y = -2x + 4 (a) (х— 1) dx (d) (х — 1) dx 2 5. 2 (x – 1) dx (e) (х — 1) dx -2 (c) (х— 1) dx (f) (х — 1) + 1) dx -4 (a) (-2x + 4) dx (d) (-2x + 4) dx y (b) (-2x + 4) dx (e) (-2x + 4) dx (c) -2х + 4) dx (f) (-6х + 12) dx (x) = V4 - (x - 2) 9. 2 3 6. (a) f(x) dx (c) f(x) dx 1 2 /3 4 (b) (d) 5f(x) dx y = f(x) -2 (a) f(x) dx (d) f(x) dx (b) f(x) c (e) f(x) dx In Exercises 10–13, a graph of a function f(x) is given; the num- bers inside the shaded regions give the area of that region. Evaluate the definite integrals using this area information. (c) f(x) dx (f) -2f(x) dx

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f(x) dx f(x) dx In Exercises 10–13, a graph of a function f(x) is given; the num- bers inside the shaded regions give the area of that region. Evaluate the definite integrals using this area information. (c) f(x) dx (f) -2f(x) dx 237 y 50 y = f(x) 11 21 3 f(x) = x² 59 1 2 3 10. 13. - 50 1/3 ! 7/3 - 100 (a) f(x) dx (d) -3f(x) dx (a) / sử dx | (x – 1)° dx (c) f(x) dx F(x)| dx (4) [ (* - 2)° + 5) dn (b) (e) (b) (x + 3) dx | (x – 2)' + 5) dx (c) f(x) dx In Exercises 14-15, a graph of the velocity function of an object moving in a straight line is given. Answer the questions based on that graph. y (ft/s) 1 2 f(x) = sin( Tx/2) 4/T 11. 1 14. 3 4/m t (s) 3 -1 (a) f(x) dx f(x) • (a) What is the object's maximum velocity? (b) What is the object's maximum displacement? (b) f(x) dx (e) \F(x)[ dx (c) What is the object's total displacement on (0, 3]? (c) f(x) dx (f) \F(x)| dx y (ft/s) 15. 10 f(x) = 3x – 3 t (s) 3 5 (a) What is the object's maximum velocity? 5 (b) What is the object's maximum displacement? 12. (c) What is the object's total displacement on [0, 5]? 4 4 4 1 16. An object is thrown straight up with a velocity, in ft/s, given by v(t) = -32t + 64, where t is in seconds, from a height -5 of 48 feet. (a) fa) dk f(x) dx (a) What is the object's maximum velocity? (b) What is the object's maximum displacement? f(x) dx (e) | F)| dx (c) When does the maximum displacement occur? (d) When when the displacement is -48ft.) the object reach a height of 0? (Hint: find (c) f(x) dx (f) \F(x)| dx 229