calculus
posted by Alyssa .
the area of the first quadrant bounded by the yaxis, the line y=4x, and the graph of y=xcosx is approximately

done, see your other post
Respond to this Question
Similar Questions

Calculus
I am doing the AP calculus review, these are the questions I have no Idea on how to do: 1. if 0<= k <=pi/2 and the area under the curve ycosx from x=k to x=pi/2 is 0.2, then k= 2. let F(x) be an antiderivative of (ln x)^4/x … 
Calculus
If the region in the first quadrant bounded by the graph of y=cosx and the interval[0,pi/2] is bisected by the line x=c, guess c. 
Calculus
Use a graphing calculator to graph f(x)=x^46x^3+11x^26x. Then use upper sums to approximate the area of the region in the first quadrant bounded by f and the xaxis using four subintervals. 
calculus
the area of the first quadrant bounded by the yaxis, the line y=4x, and the graph of y=xcosx is approximately 
Calculus
the area of the first quadrant region bounded by the yaxis, the line y=4x and the graph of y=xcosx is approximately: a) 4.50 square units, b) 4.54 square units, c) 4.56 square units, d) 4.58 square units, e) 5.00 square units 
Calculus
1. Find the area of the region bounded by the curves and lines y=e^x sin e^x, x=0, y=0, and the curve's first positive intersection with the xaxis. 2. The area under the curve of y=1/x from x=a to x=5 is approximately 0.916 where … 
Calculus
Let f be the function given by f(x)=(x^3)/4  (x^2)/3  x/2 + 3cosx. Let R be the shaded region in the second quadrant bounded by the graph of f, and let S be the shaded region bounded by the graph of f and line l, the line tangent … 
calculus
The base of a solid is the region in the first quadrant bounded by the graph of y = 3/(e^x) , the xaxis, the yaxis, and the line x=2. Each cross section of this solid perpendicular to the xaxis is a square. What is the volume of … 
AP Calculus AB
Which integral gives the area of the region in the first quadrant bounded by the axes, y = e^x, x = e^y, and the line x = 4? 
calculus
I'm having trouble on this question: Find the area of the region in the first quadrant that is bounded above by the curve y= sq rt x and below by the xaxis and the line y=x 2.