What is "given that tangent squared theta = three-eighths?

Given that tangent squared theta equals three-eighths, we can use the trigonometric identity: tan^2(theta) = sec^2(theta) - 1

Using this identity, we can find the value of secant squared theta: sec^2(theta) = tan^2(theta) + 1 sec^2(theta) = (3/8) + 1 sec^2(theta) = 11/8

Therefore, given that tangent squared theta equals three-eighths, the value of secant squared theta is eleven-eighths.