Prove that ln(cscu−cotu)=−ln(cscu+cotu)
Answers
Given : ln(cscu−cotu)=−ln(cscu+cotu)
To Find : Prove
Solution:
ln(cscu−cotu)=−ln(cscu+cotu)
LHS = ln(cscu−cotu)
= ln(1/Sinu − cosu/sinu)
= ln ( 1 - cosu)/(sin u))
multiply numerator and denominator by 1 + cosu inside ln
= ln ( 1 - cosu)(1 + cosu)/(1 + Cosu)(sin u))
= ln ( 1 - cos²u)/(1 + Cosu)(sin u))
= ln ( sin²u)/(1 + Cosu)(sin u))
= ln ( sinu)/(1 + Cosu))
= ln ( 1/(1/Sinu + Cosu/Sinu)
= ln( 1/(cscu + cotu))
= ln ((cscu + cot u)⁻¹)
= - ln(cscu+cotu)
= RHS
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SOLUTION
TO PROVE
FORMULA TO BE IMPLEMENTED
EVALUATION
Here we have
Taking logarithm in both sides we get
Hence proved
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