Question

Solve each problem. (Source for Exercises 49 and 50: Parker, M., Editor, She Does Math, Mathematical Association of America.) Find a formula for h in terms of k, A, and B. Assume A \u003c B.

Accepted Answer

Identify the given variables and what is asked: we need to express $$ h  in $$terms of $$ k $$, $$ A $$, and $$ B $$, with the condition $$ A \u003c B . $$Recall the relevant trigonometric relationships or formulas that connect these variables. Since $$ A $$ and $$ B $$ are angles and $$ h $$ and $$ k $$ are lengths, consider using the Law of Sines or Law of Cosines depending on the context. Set up an equation involving $$ h $$, $$ k $$, $$ A $$, and $$ B . $$For example, if $$ h $$ and $$ k $$ are sides opposite angles $$ A $$ and $$ B $$ respectively, the Law of Sines states:

$$\frac{h}{\sin(\doublebackslash A)} = \frac{k}{\sin(\doublebackslash B)}$$ Solve this equation for $$ h  to $$express it explicitly in terms of $$ k $$, $$ A $$, and $$ B . $$This involves multiplying both sides by $$ \sin(\doublebackslash A) $$:

$$h = k \cdot \frac{\sin(\doublebackslash A)}{\sin(\doublebackslash B)}$$ Verify the formula makes sense given the condition $$ A \u003c B $$, and ensure all variables are correctly placed to represent the relationship between $$ h $$, $$ k $$, $$ A $$, and $$ B .$$

Solve each problem. (Source for Exercises 49 and 50: Parker, M., Editor, She Does Math, Mathematical Association of America.) Find a formula for h in terms of k, A, and B. Assume A < B.

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Key Concepts

Trigonometric Functions and Their Relationships

Angle Inequalities and Their Implications

Formulating and Solving Trigonometric Equations