Q.29 The lengths of two sides of a triangle are 2 units and 3 units and the angle included by these two
sides is 60 . The length of the third side of the triangle will be
(A) √5 units (B) √7 units (C) 4 units (D) 5 units
Introduction
Finding the third side of a triangle with sides 2 and 3 and angle 60 is a classic exercise in applying the Law of Cosines, a powerful tool for non‑right triangles.
This article walks through the complete solution, checks every multiple‑choice option, and explains clearly why √7 units is the correct answer.
Step‑by‑step solution using Law of Cosines
For a triangle with sides a, b, and c, and included angle C between sides a and b, the Law of Cosines is
c² = a² + b² − 2ab cos C
where c is the side opposite angle C.
Here:
a = 2unitsb = 3unitsC = 60°
Compute squares of the known sides:
a² = 2² = 4b² = 3² = 9
Use cos 60° = 1/2.
Substitute into the formula:
c² = 4 + 9 − 2·2·3·cos 60°
c² = 13 − 12·1/2 = 13 − 6 = 7
Take the square root:
c = √7 units
Hence, the length of the third side is √7 units, matching option (B).
Explanation of each option
Option (A) √5 units
If the third side were √5, then the Law of Cosines run in reverse would give:
cos C = (a² + b² − c²) / (2ab) = (4 + 9 − 5) / (2·2·3) = 8 / 12 = 2/3
This would mean C = cos⁻¹(2/3), which is not 60°, so √5 cannot be correct.
Option (B) √7 units
Using √7 in the cosine formula:
cos C = (4 + 9 − 7) / (2·2·3) = 6 / 12 = 1/2
This matches cos 60° = 1/2, so √7 is fully consistent with the given data, making this the correct option.
Option (C) 4 units
Assuming the third side is 4:
cos C = (4 + 9 − 16) / (2·2·3) = −3 / 12 = −1/4
The angle would then satisfy C = cos⁻¹(−1/4), which is an obtuse angle greater than 90°, not 60°, therefore 4 units does not fit the condition.
Option (D) 5 units
With third side 5:
cos C = (4 + 9 − 25) / (2·2·3) = −12 / 12 = −1
This implies C = 180°, which cannot be the interior angle of a non‑degenerate triangle with sides 2, 3, and 5, so 5 units is impossible in this context.
Key takeaway for similar problems
- When given two sides and the included angle (SAS), use the Law of Cosines to find the third side of any triangle.
- Always check that the resulting side length and angle values are consistent with basic triangle properties, such as feasible angle ranges and the triangle inequality.
