MAT 1332 Lecture Notes - Lecture 3: Dxo Labs

10. (20 points (5/5/10). To earn all points: Determine the intersection points. Determine which function is greater than the other. Evaluate the definite integral correctly.) (a) Determine the x-values at which the graphs of y 2x-x2 and y x2-4 meet. (b) Sketch y 2x x2 and y x2-4 together on the graph at left. Include this with your work. Determine which function is f(x) (the upper graph) and which function is g(x) (the lower graph) as used in the formula for the area of the region between two curves. f(x) g(x)- (c) Find the area of the region bounded by the graphs of y 2x -x2 and y x2-4. Start by using the information found in (a) and (b) to fill in the area formula: J(x)-gx)] dx

3. General Methodical formula Given two continuous functions f(x) and g (x), and constants α, β , 25) (af(x) dx= 26) 「(f(x) + g(x))dx 27) [(f(x)-g(x))lx = 28) j[f(x)rf(x) dx= f(x) 31) Ing(x))g'(x)dx = 32) Area of the region bounded by the function y = f(x),x = a,x-b and the x-axis: A = 33) Volume of solids of revolution the region bounded by the function f(x),x = a,x = b about the x-axis:V

Problem #3: Which of the following represents the area of the region enclosed by the curves y = x2 and y 4x + 21 for-4 x 7? (A)(r-4x 21) dr (B)(r-4x-21) dr(+4x +21) dx (C)(r-4x -21)dx(-x* +4r +21) dx( 4x - 21) dix (D)(r-4x-21) dx(x4x+21) dr (E)(r*-4x- 21) dx x+4x + 21) dix (F)(r-4x-21) dx+(-x*+4x + 21) dx (G) x^-4x-21) dx (x+4x +21) dr (H)(x4x + 21) dx (r--4r- 21) dx