Approximate the area under the curve y = 12x−4x2 between x = 0 and x =...

approximate the area under the curve y=12x-4x2 between x=0 and x=2 using four rectangles of the...

approximate the area under the curve y=12x-4x2 between x=0 and x=2 using four rectangles of the same width and the right hand endpoint method

Approximate the area under the curve y= x2-2x+4 between x=1 and x=4 by using 6 inscribed...

Approximate the area under the curve y= x2-2x+4 between x=1 and x=4 by using 6 inscribed rectangles.

Approximate the area under the curve over the specified interval by using the indicated number of...

Approximate the area under the curve over the specified interval by using the indicated number of subintervals (or rectangles) and evaluating the function at the right-hand endpoints of the subintervals. f(x) = 25 − x2 from x = 1 to x = 3; 4 subintervals

Approximate the area under f(x) = (x – 2, above the x-axis, on [2,4] with n...

Approximate the area under f(x) = (x – 2, above the x-axis, on [2,4] with n = 4 rectangles using the (a) left endpoint, (b) right endpoint and (c) trapezoidal rule (i.e. the “average” shortcut). Be sure to include endpoint values and write summation notation for (a) and (b). Also, on (c), state whether the answer over- or underestimates the exact area and why.

1) Use finite approximation to estimate the area under the graph of f(x) = x^2 and...

1) Use finite approximation to estimate the area under the graph of f(x) = x^2 and above the graph of f(x) = 0 from Xo = 0 to Xn= 2 using i) a lower sum with two rectangles of equal width ii) a lower sum with four rectangles of equal width iii) an upper sum with two rectangles of equal width iv) an upper sum with four rectangles if equal width 2) Use finite approximation to estimate the area under...

f(x) = 1/x   from  a = 1  to  b = 3. (a) Approximate the area under the curve from...

f(x) = 1/x   from  a = 1  to  b = 3. (a) Approximate the area under the curve from a to b by calculating a Riemann sum using 10 rectangles. Use the method described in Example 1 on page 351,rounding to three decimal places. _____________square units (b) Find the exact area under the curve from a to b by evaluating an appropriate definite integral using the Fundamental Theorem. _____________square units

Estimate the area under the graph of f left parenthesis x right parenthesis equals 5 x...

Estimate the area under the graph of f left parenthesis x right parenthesis equals 5 x cubed f(x)=5x3 between x equals 0 x=0 and x equals 1 x=1 using each finite approximation below. a. A lower sum with two rectangles of equal width b. A lower sum with four rectangles of equal width c. An upper sum with two rectangles of equal width d. An upper sum with four rectangles of equal width

Approximate the area under the curve on the specified interval as directed. f(x) = x ·...

Approximate the area under the curve on the specified interval as directed. f(x) = x · 10^x on [0, 4] with 4 subintervals of equal width and midpoints for sample points?

f(x) = 2x  from  a = 4  to  b = 5 (a) Approximate the area under the curve from a...

f(x) = 2x  from  a = 4  to  b = 5 (a) Approximate the area under the curve from a to b by calculating a Riemann sum using 5 rectangles. Use the method described in Example 1 on page 351, rounding to three decimal places.   square units (b) Find the exact area under the curve from a to b by evaluating an appropriate definite integral using the Fundamental Theorem.    square units

Approximate the area under f(x) = sqrt(16-x2) from 0 to 4 using four rectangles with left...

Approximate the area under f(x) = sqrt(16-x2) from 0 to 4 using four rectangles with left endpoints. Is your approximation an overestimate or an underestimate?