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Integration of a curve in the 2nd quadrant. (2 Viewers)

summonbolt

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Hi! I was just wondering how to do the following question:

Find the area enclosed between the lines y=4 and y=1-x in the second quadrant
using integration. My teacher solved the question by doing the area as a triangle, but I was just wondering if there's a way to solve using integration. Thanks!
 

InteGrand

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Hi! I was just wondering how to do the following question:

Find the area enclosed between the lines y=4 and y=1-x in the second quadrant
using integration. My teacher solved the question by doing the area as a triangle, but I was just wondering if there's a way to solve using integration. Thanks!
 

RickB

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Hi,

The graphs of y = 4 and y = 1 - x meet at (-3, 4). The required area will be (area from y = 4 down to the x-axis) MINUS (area from y = 1 - x down to x-axis), starting at x = -3 and ending at x = 0. So, your calculation will be

INTEGRAL (-3 to 0) of 4 MINUS INTEGRAL (-3 to 0) of 1 - x.

Should give 4.5 which is the area.
 

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