Using rectangles each of whose height is given by the value of the function at the...

Using rectangles whose height is given by the value of the function at the midpoint of...

Using rectangles whose height is given by the value of the function at the midpoint of the​ rectangle's base​ (the midpoint​ rule), estimate the area under the graph of the following​ function, using two and then four rectangles. y=4−x^2 between x =− 2 and x= 2

Using rectangles whose height is given by the value of the function at the midpoint of...

Using rectangles whose height is given by the value of the function at the midpoint of the​ rectangle's base​ (the midpoint​ rule), estimate the area under the graph of the following​ function, using two and then four rectangles. y=25-x2 between x=-5 and x=5 For two​ rectangles, area ≈______ For two​ rectangles, area ≈______

Using rectangles whose height is given by the value of the function at the midpoint of...

Using rectangles whose height is given by the value of the function at the midpoint of the rectangle's base, estimate the area under the graph using first two and then four rectangles. f(x)=x^(2) on [1,3], Using two rectangles to estimate, the area under f(x) is approximately ,Using Four rectangles to estimate, the area under f(x) is approximately

You are given the function f(x) = 4 - x^2. Using four approximating rectangles and left...

You are given the function f(x) = 4 - x^2. Using four approximating rectangles and left endpoints, estimate the area under the graph of f(x) from x=0 to x=2. Estimated area =  Repeat the above calculation using right endpoints. Estimated area =  Your answers should have two digits after the decimal.

Estimate the area under the curve described by f(x)=x2+1 between [1, 3] using 8 rectangles. You...

Estimate the area under the curve described by f(x)=x2+1 between [1, 3] using 8 rectangles. You may define the height of your rectangles using the left- or right-edge.

Use finite approximations to estimate the area under the graph of the function ​f(x) =8−x2+2x between...

Use finite approximations to estimate the area under the graph of the function ​f(x) =8−x2+2x between x = −2 and x = 4 for each of the following cases. a. Using a lower sum with two rectangles of equal width b. Using a lower sum with four rectangles of equal width c. Using an upper sum with two rectangles of equal width d. Using an upper sum with four rectangles of equal width

(1 bookmark) Use the midpoint rule to estimate the area under graph of f(x) =5/x and...

(1 bookmark) Use the midpoint rule to estimate the area under graph of f(x) =5/x and above the graph of f(x) = 0 from X0 = 1 to Xn =65 Using two rectangles equal width and four rectangles of equal width

Use a finite approximation to estimate the area under the graph of the given function on...

Use a finite approximation to estimate the area under the graph of the given function on the stated interval as instructed. 1) f(x) = x 2 between x = 3 and x = 7 using a left sum with four rectangles of equal width.

Use finite approximations to estimate the area under the graph of the function ​f(x) = 24−x2+2x...

Use finite approximations to estimate the area under the graph of the function ​f(x) = 24−x2+2x between x = −4 and x = 6 for each of the following cases. a. Using a lower sum with two rectangles of equal width b. Using a lower sum with four rectangles of equal width c. Using an upper sum with two rectangles of equal width d. Using an upper sum with four rectangles of equal width

Use the rectangles to approximate the area of the region. (Round your answer to three decimal...

Use the rectangles to approximate the area of the region. (Round your answer to three decimal places.) The x y-coordinate plane is given. There is 1 curve, a shaded region, and 4 rectangles on the graph. The curve enters the window in the first quadrant, goes down and right becoming less steep, passes through the point (1, 5), passes through the point (5, 1), and exits the window almost horizontally above the x-axis. The region below the curve, above the...