-76 POINTS SCALCET8 5.1.001. Consider the following. y = f(x) V 00 (a) By reading values...
Consider the following. (a) By reading values from the given graph of f, use five rectangles to find a lower estimate for the area under the given graph off from x = 0 to x = 10. (Round your answer to one decimal place.) 10 Sketch the rectangles that our USA By reading values from the given graph of f, use five rectangles to find an upper estimate for the area under the given graph of Ffrom x = 0...
1. (-14 Points) DETAILS SESSCALC2 4.1.001. Consider the following equation and figure. a = 50 y a y = f(x) a 2a (a) By reading values from the given graph of f, use five rectangles to find a lower estimate and an upper estimate for the area A under the given graph off from x = 0 to x = 100. A2 (lower estimate) A (upper estimate) (b) Find new estimates using ten rectangles in each case. A (lower estimate)...
You are given the table below. 16 20 4 8 12 X f(x) 12 2417 6 30 Use the table and n = 4 to estimate the following. Because the data is not monotone (only increasing or only decreasing), you should sketch a possible graph and draw the rectangles to ensure you are using the appropriate values for a lower estimate and an upper estimate. 20 f(x)dx lower estimate upper estimate Estimate the area of the region under the curve...
Use finite approximation to estimate the area under the graph of f(x) = x² and above the graph of f(x) = 0 from Xo = 0 to x = 4 using i) a lower sum with two rectangles of equal width ii) a lower sum with four rectangles of equal width ii) an upper sum with two rectangles of equal width iv) an upper sum with four rectangles of equal width The estimated area using a lower sum with two...
Use finite approximation to estimate the area under the graph of f(x) =x2 and above the graph of f(x) = 0 from x0-0 to xn-14 using i) a lower sum with two rectangles of equal width. ii) a lower sum with four rectangles of equal width ili) an upper sum with two rectangles of equal width iv) an upper sum with four rectangles of equal width. The estimated area using a lower sum with two rectangles of equal width is...
Use finite approximation to estimate the area under the graph of f(x) = 9x? and above the graph of f(x) = O from xo + 0 to x = 4 using i) a lower sum with two rectangles of equal width ii) a lower sum with four rectangles of equal width ii) an upper sum with two rectangles of equal width. iv) an upper sum with four rectangles of equal width. The estimated area using a lower sum with two...
Consider the graph 12 10 6, 9) y-f(x 8 (2, 7) (4, 5) (0, 3) (8, 0) 10 (a) Using the indicated subintervals, approximate the shaded area by using lower sums s (rectangles that lie below the graph of f) (b) Using the indicated subintervals, approximate the shaded area by using upper sums S (rectangles that extend above the graph of f) +-14 points SullivanCalc1 5.1.019 Approximate the area A under the graph of function f from a to b...
Consider the following. y 24 y = f(x 12 Y 24 12 (a) Use six rectangles to find estimates of each type for the area under the given graph of ffrom x = 0 to x 36 (i) Sample points are left endpoints. L6 = (ii) Sample points are right endpoints. R6 are midpoints (ii) Sample points M6 (b) Is L an underestimate or overestimate of the true area? overestimate underestimate underestimate or overestimate of the true area? (c) Is...
3. + -12 points CalcET8 5.2.007. A table of values of an increasing function f is shown. Use the table to find lower and upper estimates for 30 f(x) dx. J10 lower estimate upper estimate x 10 14 18 22 26 30 Need Help? Read It Watch It Talk to a Tutor Submit Answer Practice Another Version 4. 0/1 points Previous Answers SCalcET8 5.2.009. Use the Midpoint Rule with the given value of n to approximate the integral. Round the...
please help me with these two questions. i dont have anymore posts. i will rate high. thank you find X2: Use Newton's method to estimate the two zeros of the function f(x) = x* - 2x - 21. Start with Xo = - 1 for the left-hand zero and with Xo = 1 for the zero on the right. Then, in each case, Determine x2 when Xo = -1. X2 = (Simplify your answer. Round the final answer to four...