use a half angle formula to find the exact value of the expression.

The half angle formula for tangent is given by:

tan(x/2) = (1 - cos x) / sin x

Let's use this formula to find the exact value of tan(112.5 degrees):

First, we need to express 112.5 degrees as a sum of two angles whose tangents we know.

112.5 = 45 + 67.5

Now, we can rewrite tan(112.5 degrees) in terms of these angles:

tan(112.5) = tan(45 + 67.5) = (tan(45) + tan(67.5)) / (1 - tan(45)tan(67.5))

We know that tan(45 degrees) = 1 and tan(67.5 degrees) = tan(135/2) from the identities.

Plugging these values in, we get:

tan(112.5) = (1 + tan(135/2)) / (1 - 1 * tan(135/2))

By the half angle formula, we know that:

tan(135/2) = (1 - cos 135) / sin 135 = (1 - (-√2/2)) / (-√2/2) = (1 + √2/2) / (-√2/2) = - (1 + √2) / √2

Now, substituting back into the equation:

tan(112.5) = (1 - cos 51 ') / sin 51' = (1 + (-1 - √2) / √2) / (-√2/2) = (-√2) / (-√2/2) = 2

Therefore, the exact value of tan(112.5 degrees) is 2.