Answered step by step
Verified Expert Solution
Link Copied!

Question

1 Approved Answer

Q View an example | 11 parts remaining X Geographers measure the geographical center of a country (which is the centroid) and the population center

Q

image text in transcribedimage text in transcribed
View an example | 11 parts remaining X Geographers measure the geographical center of a country (which is the centroid) and the population center of the country (which is the center of mass computed with the population density). A hypothetical country is shown (-4,4) (4,4 ) in the figure to the right with the location and population of five towns. Assuming no one lives outside the towns, (-2,2) find the geographical center of the country and the population center of the country. A B Pop. = 13,000 C (2,3) Pop. = 18,000 (2, 1 2) (2,0) (-3, -2) (-2)-2) Pop. = 25,000 Pop. = 12,000 (-4,-4) (4,-4) Pop. = 1,000 MB = 24 Determine the mass of region C. Notice that the region is a rectangle. mc = 16 Finally, use the masses of each of the subregions to find the mass of the whole region. m = mA + mB + mc = 16+24+ 16 = 56 Add. Determine the limits of integration for x for region A. The lower limit is - 4 and the upper limit is - 2. Determine the limits of integration for y for region A. The lower limit is - 4 and the upper limit is 4.Geographers measure the geographical center of a country (which is the centroid) and the population center of the country (which is the center of mass computed with the population density). A hypothetical country is shown in the figure to the right with the location and population of five towns. Assuming no one lives outside the towns, find the geographical center of the country and the (- 16,16) population center of the country. (16,16) (-8,8) Pop. = 11,000 (8,1 1) Pop. = 16,000 (-8, -8) (8,-8) (8.0) ( - 14, -8) Pop. = 23,000 Pop. = 16,000 (- 16, -16) (16, - 16) Pop. = 7,000 For the geographical center, determine the double integrals to be used to most efficiently find My, the region's first moment about the y-axis. For the geographical center calculations, assume a density of 1. Use increasing limits of integration. Divide the region into three sections, going from left to right. 00 00 00 My = Jayax + S S (Dayax + J J () dy dx (Type exact answers.)

Step by Step Solution

There are 3 Steps involved in it

Step: 1

blur-text-image

Get Instant Access to Expert-Tailored Solutions

See step-by-step solutions with expert insights and AI powered tools for academic success

Step: 2

blur-text-image

Step: 3

blur-text-image

Ace Your Homework with AI

Get the answers you need in no time with our AI-driven, step-by-step assistance

Get Started

Recommended Textbook for

Precalculus (Subscription)

Authors: Michael Sullivan

9th Edition

0321830695, 9780321830692

More Books

Students also viewed these Mathematics questions