1. Find the value of tan 55°.
Solution: Find the value of sin 55° by the using the table of natural sines we need to go through the extreme left vertical column 0° to 89° and move downwards till we reach the angle 55°.
Then we move horizontally to the right at the top of the column headed by 0' (or 0.0°) and read the figure 1.4281, which is the require value of tan 55°.
Therefore tan55° = 1.4281 .... Answer
2. Find the value of tan 60°36’
Solution: Find the value of tan 60°36’ by the using the table of natural tan we need to go through the extreme left vertical column 0° to 89° and move downwards till we reach the angle 60°.
Then we move horizontally to the right at the top of the column headed by 36' (or 0.6°) and read the figure 1.7747 , which is the require value of tan 60°36’ .
Therefore tan 60°36’ = 1.7747 ... Answer
3.Use tables to find tan72°60'
Solution: Using the trigonometric table of natural tangents. tan 72°60' = tan ( 72° + 60') = tan (72°+ 1° ) = tan (71°) Because 60' = 1°
Therefore tan 70°60' = tan (71°)= 2.9042
tan 72°60'= 2.9042 ... Answer
4. Find the angle θ, tan θ = 1.4994
solution : tan θ = 1.4994
Therefore θ = tan⁻¹ 1.4994 = 56°18′ because in the table, the value 1.4994 corresponds to the column of 18′ in the row of 56°.
θ = tan⁻¹ 1.4994
= 56°18′ or 56.3° .... Answer
