Q.13 Simplify sin A / (1 + cos A) + (1 + cos A) / sin A .
(A) 2 sec A (B) 2 cosec A (C) sec A (D) cosec A
The given expression simplifies to 2 csc A, so the correct option is (B) 2 cosec A.
Introduction
Simplifying trigonometric expressions like sin A / (1 + cos A) + (1 + cos A) / sin A is a common question in school exams and competitive tests. Mastering such problems strengthens understanding of trigonometric identities and helps in quickly identifying the correct option in multiple-choice questions.
Step-by-step Simplification
Given:
sin A / (1 + cos A) + (1 + cos A) / sin A
Take the LCM of the two fractions:
[sin² A + (1 + cos A)²] / [sin A (1 + cos A)]
Here, the numerator becomes sin² A + (1 + cos A)².
Expand (1 + cos A)²:
(1 + cos A)² = 1 + 2 cos A + cos² A
So the numerator is
sin² A + 1 + 2 cos A + cos² A
Use the Pythagorean identity sin² A + cos² A = 1:
sin² A + cos² A = 1 ⇒ sin² A + cos² A + 1 = 2
Thus the numerator becomes
2 + 2 cos A = 2 (1 + cos A)
Substitute back into the fraction:
[2 (1 + cos A)] / [sin A (1 + cos A)]
Cancel (1 + cos A) from numerator and denominator:
2 / sin A = 2 csc A
So, the simplified value is 2 csc A.
Explanation of Each Option
The options are:
- (A) 2 sec A
- (B) 2 cosec A
- (C) sec A
- (D) cosec A
Option (A) 2 sec A
sec A = 1 / cos A.
The simplified expression becomes 2 csc A = 2 / sin A, which depends on sin A, not cos A, so this option is incorrect.
Option (B) 2 cosec A
cosec A = 1 / sin A.
The final simplification gives 2 / sin A = 2 cosec A, so this option matches exactly and is correct.
Option (C) sec A
This is half of 2 sec A and still involves cos A rather than sin A, so it does not agree with the derived result 2 csc A.
Option (D) cosec A
This has the right trigonometric function but the wrong coefficient; the expression simplifies to 2 cosec A, not cosec A alone, so this is also incorrect.
Why the Identity is Useful
This identity,
sin A / (1 + cos A) + (1 + cos A) / sin A = 2 csc A,
is a standard trigonometric simplification used in many exam problems and proofs.
Recognizing patterns like sin² A + cos² A = 1 and using algebraic expansion helps solve similar expressions quickly and accurately.


