Given that A = 46° in the picture below, find the length of the two legs. Round your answers to the nearest thousandth. 2 leg adjacent to A = leg opposite to A = Question Help: Message instruct A 9

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**Problem Statement:** Given that \( A = 46^\circ \) in the picture below, find the length of the two legs. Round your answers to the nearest thousandth. **Diagram:** The diagram displays a right-angled triangle. The angle \( A \) at the bottom left corner is \( 46^\circ \), which is marked with a blue arc. The triangle has the following known sides: 1. The hypotenuse, opposite the right angle, is labeled as \( 4 \). 2. One of the legs opposite angle \( A \) is labeled as \( 2 \). 3. The other leg, adjacent to angle \( A \), is left unmarked. **Formulas:** We will use trigonometric functions to find the unknown lengths: 1. Cosine function: \(\cos(\theta) = \frac{\text{adjacent}}{\text{hypotenuse}}\) 2. Sine function: \(\sin(\theta) = \frac{\text{opposite}}{\text{hypotenuse}}\) Given the known angle (\( A = 46^\circ \)) and the hypotenuse (\( 4 \)), we can find the lengths of the adjacent and opposite legs. **Solution:** 1. Length of the leg adjacent to \( A \): \[ \cos(46^\circ) = \frac{\text{adjacent leg}}{4} \] \[ \text{adjacent leg} = 4 \cdot \cos(46^\circ) \] 2. Length of the leg opposite to \( A \): \[ \sin(46^\circ) = \frac{\text{opposite leg}}{4} \] \[ \text{opposite leg} = 4 \cdot \sin(46^\circ) \] **Input Fields:** - **Leg adjacent to \( A \) =** [Input box] - **Leg opposite to \( A \) =** [Input box] **Support:** - [Message instructor] (A clickable link or button to get help from the instructor) **Notes:** For accuracy, make sure to use a calculator set to degrees when computing the trigonometric functions.