If \( h^{\sin ^{2} \theta,}+\cos \) \( 2 \sec ^{2} \theta_{2}=k \sin ^{2} \) \( |b|=\frac{\sqrt{2(h+i)}}{2} w h= \)

It seems like your expression is a bit jumbled and may contain some typographical errors. Let's break it down and clarify what you're trying to express. 1. **First part**: \( h^{\sin^2 \theta} + \cos \) - This seems to be an expression involving \( h \) raised to the power of \( \sin^2 \theta \) plus the cosine function. However, it is incomplete. 2. **Second part**: \( 2 \sec^2 \theta_2 = k \sin^2 \) - This looks like an equation involving the secant function. It states that twice the secant squared of some angle \( \theta_2 \) equals \( k \) times the sine squared of some angle. Again, it seems incomplete. 3. **Third part**: \( |b| = \frac{\sqrt{2(h+i)}}{2} \) - This part defines the absolute value of \( b \) in terms of \( h \) and \( i \) (where \( i \) is likely the imaginary unit). This part is clearer. 4. **Fourth part**: \( w h = \) - This seems to be an incomplete expression or equation. To assist you better, could you please clarify what you are trying to achieve with these expressions? Are you looking to solve for a variable, simplify an expression, or something else? Providing more context or correcting any potential errors would be helpful!