Find the area enclosed between sin(x) & cos(x) between x = 0 & x=π2.
A
2√2
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B
2
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C
2√2−2
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D
2√2+2
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Solution
The correct option is C2√2−2 Let’s look at the graph of sinx and cosx between x = 0 & x=π2.
We can see that x=π4 is the point where both sin(x) and cos(x) intersect. From [0,π4]cos(x)≥sin(x)andfrom[π4,π2]sin(x)≥cos(x). Let the enclosed area be = A A=∫π40cos(x)−sin(x)dx+∫π2π4sin(x)−cos(x)dxA=[sin(x)−{−cos(x)}]π40−[cos(x)+sin(x)]π2π4A=1√2+1√2−(1)−(1−1√2−1√2)A=2√2−2