**Get Sketch The Region Enclosed By The Given Curves. Y = 4/X, Y = 16X, Y = 1 4 X, X > 0
Gif**. Each integral is the upper function minus the lower function. Y=4/x, y = 16x, y = 1/4x, x > 0 find its area.

Find the area of the region bounded above by y = x2 + 1, bounded below by y = x, and bounded on the sides by x = 0 and x = 1. Then integrate as normal and solve. I don't need the curve sketch;

### The regions are determined by the intersection points of the curves.

Procedure to sketch the region bounded by the two curves is explained below: Find the points of intersection of the above curves point of intersection of above curves is a(4,1) point of intersection of abovview the full answer. If there are intersection points, we should break up the interval into several subintervals and determine which curve is greater on each subinterval. Find the area enclosed by the two curves.