What is m∠V ? Round only your final answer to the nearest tenth. 53.9º 56.1º 61.9º 70.0º The figure shows acute triangle U V W. The length of side U V is 7.6 inches. The length of side V W is 8.6 inches. The length of side W U is 7.4 inches.

The correct option is:  53.9°ExplanationAccording  to the below diagram,  [tex]\triangle UVW[/tex] is acute triangle, in which [tex]\overline{UV}= 7.6 inches, \overline{VW}= 8.6 inches[/tex] and [tex]\overline{WU}=7.4 inches[/tex]If we apply cosine rule here, then we will get.....[tex]cos(V) = \frac{(UV)^2+(VW)^2 -(WU)^2}{2(UV)(VW)}[/tex]Now, plugging the given values, we will get.... [tex]cos(V)=\frac{(7.6)^2+(8.6)^2-(7.4)^2}{2(7.6)(8.6)}\\ \\ cos(V)= \frac{76.96}{130.72}=0.58873...\\ \\ V= cos^-^1(0.58873...)=53.932.... \approx 53.9 degree[/tex]So, the measure of [tex]\angle V[/tex] is 53.9°