1
answer
0
watching
481
views
6 Nov 2019
Use a linear approximation to estimate the quantity to four decimal places Find the total area of the region between the curve and the x-axis. 2) Find the area of the shaded region 3) 3) y- 2 y - 2sin(rx) 4) y-2x2+x 6 y-x2.4 a. Find the limit. + X 5) Use a finite approximation to estimate the area under the graph of the given function on the stated interval as instructed 6) f(x) 2 between x . 4 and x-8 using the midpoint sum with four rectangles of equal 6) width. Solve the initial value problem Graph the integrand and use geometry to evaluate the integral. Compute the definite integral as the limit of Riemann sums 9) Use the substitution formula to evaluate the integral L/2 10)_ 10) 0 (2 5 sin Determine the indefinite integral. Check your work by differentiation. 13 0 6 90 12) sec θ . cos e 1b the conclusion of the Mean Value Theorem tor Find the value or values of e that satisty the equationD- the function and interval. 13 12.9 13) Find the average value of the function over the given interval. 14) y-x2. 5x+6:(0.8 14) Find the pointis) at which the given function equals its average value on the given interval. 15) Evaluate the integral. 16)ã«å+4)dt 16) Ï7-sin 10x dx 17) 10 Show transcribed image text
Use a linear approximation to estimate the quantity to four decimal places Find the total area of the region between the curve and the x-axis. 2) Find the area of the shaded region 3) 3) y- 2 y - 2sin(rx) 4) y-2x2+x 6 y-x2.4 a. Find the limit. + X 5) Use a finite approximation to estimate the area under the graph of the given function on the stated interval as instructed 6) f(x) 2 between x . 4 and x-8 using the midpoint sum with four rectangles of equal 6) width.
Solve the initial value problem Graph the integrand and use geometry to evaluate the integral. Compute the definite integral as the limit of Riemann sums 9) Use the substitution formula to evaluate the integral L/2 10)_ 10) 0 (2 5 sin Determine the indefinite integral. Check your work by differentiation. 13 0 6 90 12) sec θ . cos e 1b the conclusion of the Mean Value Theorem tor Find the value or values of e that satisty the equationD- the function and interval. 13 12.9 13) Find the average value of the function over the given interval. 14) y-x2. 5x+6:(0.8 14) Find the pointis) at which the given function equals its average value on the given interval. 15) Evaluate the integral. 16)ã«å+4)dt 16) Ï7-sin 10x dx 17) 10
Show transcribed image text Sixta KovacekLv2
2 Mar 2019