How do you evaluate the definite integral $int dx$ from $[12,20]$ ?

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How do you evaluate the definite integral $int dx$ from $[12,20]$ ?

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Answer 1 · 2017-06-16T06:49:21

$int_12^20dx=8$

Explanation:

The definite integral $intdx$ from $[12,20]$ is written as

$int_12^20dx$ or $int_12^20 1xxdx$

and as differential of $x$ is $1$ , $intdx=int1dx=x$

and $int_12^20dx=[x]_12^20=20-12=8$

Answer 2 · 2017-06-16T06:59:52

$8$

Explanation:

$int_12^(20)1dx$

$=[x]_12^(20)$

$=20-12larr" upper - lower"$

$=8$

Answer 3 · 2017-06-16T09:24:20

$8$

Explanation:

A definite integral (by its very definition) represents the area under the associated function, which in this case is the area under a straight line $y=1$ between $x=12$ and $x=20$ , which is a rectangle.

Thus, using $A="base" xx "height"$ :

$int_12^20 \ dx = (20-12)(1) = 8$

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How do you evaluate the definite integral $int dx$ from $[12,20]$ ?

3 Answers

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How do you evaluate the definite integral $int dx$ from $[12,20]$ ?