A) \[2\sqrt{ab}>a+b\]
B) \[2\sqrt{ab}<a+b\]
C) \[2\sqrt{ab}=a+b\]
D) None of these
Correct Answer: B
Solution :
The area bounded by the given curves is shown in figure. The required area is \[=\int_{x=-1}^{0}{\{(3+x)-(-x+1)\}}dx\] \[+\int_{x=0}^{0}{\{(3-x)-(-x+1)\}}dx\] \[+\int_{x=1}^{2}{\{(3-x)-(x-1)\}}dx\] \[=\int_{-1}^{2}{(3x+2)dx}+\int_{0}^{1}{2dx}+\int_{1}^{2}{(4-2x)}dx\] \[=({{x}^{2}}+2x)_{-1}^{0}+(2x)_{0}^{1}+(4x-{{x}^{2}})_{1}^{2}\] \[=0-(1-2)+(2-0)+(8-4-4+1)\] \[=1+2+1\] \[=4\]You need to login to perform this action.
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