Score: \( 6 / 8 \) Penalty: none Question In \( \triangle \mathrm{UVW} \), the measure of \( \angle \mathrm{W}=90^{\circ}, \mathrm{VU}=37 \), \( \mathrm{WV}=35 \), and \( \mathrm{UW}=12 \). What is the value of the tangent of \( \angle \mathrm{V} \) to the nearest hundredth?

To find the tangent of \( \angle V \) in the right triangle \( \triangle UVW \) with the right angle at \( W \), follow these steps: 1. **Identify the Sides:** - **Hypotenuse (opposite the right angle \( W \))**: \( UV = 37 \) - **Adjacent side to \( \angle V \)**: \( VW = 35 \) - **Opposite side to \( \angle V \)**: \( UW = 12 \) 2. **Calculate the Tangent:** The tangent of an angle in a right triangle is the ratio of the length of the opposite side to the length of the adjacent side. \[ \tan V = \frac{\text{Opposite}}{\text{Adjacent}} = \frac{UW}{VW} = \frac{12}{35} \] 3. **Compute the Value:** \[ \frac{12}{35} \approx 0.342857 \] 4. **Round to the Nearest Hundredth:** \[ 0.342857 \approx 0.34 \] **Answer:** The tangent of \( \angle V \) is \( 0.34 \).