∫√x2+4x+6dx is equal to
(where C is integration constant)
A
x+22√x2+4x+6+ln∣∣x+2+√x2+4x+6∣∣+C
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B
ln∣∣x+2+√x2+4x+6∣∣+C
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C
12tan−1(x+2√2)+C
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D
x2√x2+4x+6+ln∣∣x+√x2+4x+6∣∣+C
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Solution
The correct option is Ax+22√x2+4x+6+ln∣∣x+2+√x2+4x+6∣∣+C Let I=∫√x2+4x+6dx=∫√(x+2)2+(√2)2dx⇒I=(x+2)2√x2+4x+6+22ln∣∣(x+2)+√x2+4x+6∣∣+C[∵∫√x2+a2dx=x2√x2+a2+a22ln∣∣x+√x2+a2∣∣+C]∴I=(x+2)2√x2+4x+6+ln∣∣(x+2)+√x2+4x+6∣∣+C