×
Log in to StudySoup
Get Full Access to Vector Mechanics For Engineers: Statics - 10 Edition - Chapter 5 - Problem 5.36
Join StudySoup for FREE
Get Full Access to Vector Mechanics For Engineers: Statics - 10 Edition - Chapter 5 - Problem 5.36

Already have an account? Login here
×
Reset your password

Get solution: Determine by direct integration the centroid of the area shown. Express

Vector Mechanics for Engineers: Statics | 10th Edition | ISBN: 9780077402280 | Authors: Ferdinand Beer, E. Russell Johnston Jr., David Mazurek ISBN: 9780077402280 491

Solution for problem 5.36 Chapter 5

Vector Mechanics for Engineers: Statics | 10th Edition

  • Textbook Solutions
  • 2901 Step-by-step solutions solved by professors and subject experts
  • Get 24/7 help from StudySoup virtual teaching assistants
Vector Mechanics for Engineers: Statics | 10th Edition | ISBN: 9780077402280 | Authors: Ferdinand Beer, E. Russell Johnston Jr., David Mazurek

Vector Mechanics for Engineers: Statics | 10th Edition

4 5 1 396 Reviews
16
3
Problem 5.36

Determine by direct integration the centroid of the area shown. Express your answer in terms of a and h.

Step-by-Step Solution:
Step 1 of 3

­last resort, use else statement. Cannot put anything after the “else” expression or it won’t read it ­only “if” and “end” are needed ­ the “elseif” and and “else” are not NEEDED >> %Day 7 MATLAB examples >> a=10;b=15;c=20; >> x=a> y=a>c||b> %one means yes, zero means no >> z=a>c&&b> %these are 3 logical operators >> v=x&y v = 1 >> %if x is true and y is true, you should get a true for v as well >> %string compare syntax is "strcmp('Yes','No') >> %ex. s1='upon';s2={'Once','Upon','A','Time'};tf=strcmp(s1,s2) >> s1='upon';s2={'Once','Upon','A','Time'};tf=strcmp(s1,s2) tf = 0 0 0 0 >> %It's comparing each thing and saying yes this is true (1)

Step 2 of 3

Chapter 5, Problem 5.36 is Solved
Step 3 of 3

Textbook: Vector Mechanics for Engineers: Statics
Edition: 10
Author: Ferdinand Beer, E. Russell Johnston Jr., David Mazurek
ISBN: 9780077402280

Other solutions

People also purchased

Related chapters

Unlock Textbook Solution

Enter your email below to unlock your verified solution to:

Get solution: Determine by direct integration the centroid of the area shown. Express