Answer:
34°
Step-by-step explanation:
We need to use the law of cosines to find angle J.
[tex]11^{2}=19^{2} +13^{2} -2(19)(13)cos(J)\\121=361+169-494cos(J)\\121=530-494cos(J)\\121-530=-494cos(J)\\-409=-494cos(J)\\cos(J)=\frac{-409}{-494} \approx 0.8\\ J \approx cos^{-1}(\frac{409}{494} ) \approx 34\°[/tex]
Therefore, the right answer is the second choice, 34°.
Remember, when you apply the law of cosines, the first square in the formula must be the opposite side to the angle we want to find.
