Learning Target INT2: I can calculate the area between curves, net change, and displacement using geometric for- mulas and Riemann sums. Consider the function f(x) sin² (r) on the interval [-7,7]. Here's a graph on Desmos. 1. Sketch the curve and draw approximating rectangles for the left-endpoint and right-endpoint approx- imations with n = 8. 2. Write down the sum to find the left-endpoint approximation with n = 8; then approximate it (you can use a spreadsheet; round to 4 decimal places.) Note: if you see something like 1.49976E-32, that's a rounding error; the E-32 means it's 0.0000000000000000000000000000000149, so it's actually 0 and the calculator/Excel lied to you.. 3. Write down the sum to find the right-endpoint approximation with n = 8; then approximate it (you can use a spreadsheet; round to 4 decimal places.)

Transcribed Image Text:

Learning Target INT2: I can calculate the area between curves, net change, and displacement using geometric for mulas and Riemann sums. Consider the function f(x) = sin²(x) on the interval [-7, 7]. Here's a graph on Desmos. 1. Sketch the curve and draw approximating rectangles for the left-endpoint and right-endpoint approx- imations with n = 8. 2. Write down the sum to find the left-endpoint approximation with n = 8; then approximate it (you can use a spreadsheet; round to 4 decimal places.) Note: if you see something like 1.49976E-32, that's a rounding error; the E-32 means it's 0.0000000000000000000000000000000149, so it's actually 0 and the calculator/Excel lied to you.. 3. Write down the sum to find the right-endpoint approximation with n = 8; then approximate it (you can use a spreadsheet; round to 4 decimal places.)