Question

Asked Sep 10, 2019

3 views

Find the exact area of the surface obtained by rotating the curve about the x-axis. y= square root of 1 + e^{X }, 0<= x<= 5

Step 1

The given curve is

Step 2

__Formula used: __

If *f* is a positive function and has continuous derivative, then the surface area of the surface obtained by rotating the curve of the form *y *= *f ( x *) is given by

Step 3

Differentiate the given equation with res...

Tagged in

Find answers to questions asked by student like you

Show more Q&A

Q: Consider the following function. 10.1 s(t) 14.6e3.2t (a) Identify the logistic function as increasin...

A: Part (a)In order to find whether the function is increasing or decreasig, we need to differetiate it...

Q: 27 please

A: First complete square of the denominator.

Q: (9/5)*(10/18)

A: Given,

Q: Please answer d through f using the graph. Thank you!

A: Explanation:From the given graph it is observed that the g(x) approaches 2 as x tends to 5− and 5+, ...

Q: What is the slope of the graph? (d) Find the output for which the input is three. Explain its signif...

A: For a standard equation of straight line: y = mx + c; the slope of the line is represented by "m".

Q: Help.

A: Take u = 1/x5.

Q: Find an equation of a line with the x- and y-intercepts below. Use exact fractions when necessary. x...

A: Given,

Q: Help.

A: Let's call the given integral as "I".Please see the white board.

Q: Find numbers a and b so that f is continuous at every point.

A: Given,