Solve the triangle. a = 10, b = 23, C = 95° (2 points) c ≈ 25.1, A ≈ 26.8°, B ≈ 58.2° c ≈ 25.1, A ≈ 22.8°, B ≈ 62.2° c ≈ 25.9, A ≈ 22.8°, B ≈ 62.2° c ≈ 25.9, A ≈ 59.2°, B ≈ 25.8°

Answer:c ≈ 25.9, A ≈ 22.8°, B ≈ 62.2°Step-by-step explanation:The Law of Cosines can be used to find the third side.... c² = a² + b² - 2ab·cos(C)... c² ≈ 100 +529 -2·10·23·cos(95°)... c² ≈ 669.0916... c ≈ √669.0916 ≈ 25.87From the Law of Sines, we can find the remaining angles.... sin(B)/b = sin(C)/c... B = arcsin(b/c·sin(C)) ≈ 62.35°These results are sufficient to make the appropriate answer choice._____Comment on Answer DiscrepanciesIf the "c" used in the calculation of B is inappropriately rounded to 25.9, then the result for angle B is 62.21°. This is in error by more than 0.1°. Intermediate results should never be rounded, but should be carried to full calculator precision. Only final answers should be rounded.