To find tan(2a), we can use the double angle formula for tangent:
tan(2a) = 2tan(a) / (1 – tan2(a))
First, we need to find tan(a). We know:
sin(a) = 1/10
Now, we can calculate cos(a) using the Pythagorean identity:
cos(a) = √(1 – sin2(a))
Calculating that:
cos(a) = √(1 – (1/10)2) = √(1 – 1/100) = √(99/100) = √99/10
Now, we can find tan(a):
tan(a) = sin(a) / cos(a) = (1/10) / (√99/10) = 1 / √99
Now we can compute tan(2a):
tan(2a) = 2tan(a) / (1 – tan2(a))
Calculating tan2(a):
tan2(a) = (1 / √99)2 = 1 / 99
Substituting back into the formula:
tan(2a) = 2(1 / √99) / (1 – 1/99) = 2/√99 / (98/99) = (2 * 99) / (√99 * 98)
Simplifying further gives:
tan(2a) = 198 / (√99 * 98)
So the final answer is:
tan(2a) = 198 / (√99 * 98)