Answer to Question #142866 in Trigonometry for Raffy

"b = 4.2cm\\\\\nc = 3.5cm\\\\\nC = 51\u00b048' = 51.8\u00b0"

To solve for angle B, we use the sine rule,

"\\begin{aligned}\n\\dfrac{b}{sinB} &= \\dfrac{c}{sinC}\\\\\n\\\\\n\\dfrac{4.2}{sinB} &= \\dfrac{3.5}{sin51.8}\\\\\n\\\\\nsinB &= \\dfrac{4.2\u00d7sin51.8}{3.5}\\\\\n\\\\\nsinB &= 0.9430\\\\\nB &= 70.6\u00b0\n\\end{aligned}"

To solve for angle A,

Sum of internal angles in a triangle = 180°

"\\therefore" A + B + C = 180°

A = 180° - B - C

A = 180° - 70.6° - 51.8°

"\\therefore" A = 57.6°

To solve for side a, we use the sine rule;

"\\begin{aligned}\n\\dfrac{a}{sinA} &= \\dfrac{c}{sinC}\\\\\n\\\\\n\\dfrac{a}{sin57.6} &= \\dfrac{3.5}{sin51.8}\\\\\n\\\\\na &= \\dfrac{3.5\u00d7 sin57.6}{sin51.8}\\\\\n\\\\\na &= 3.76cm\n\\end{aligned}"

"\\therefore" a = 3.76cm, b = 4.2cm, c = 3.5cm

A = 57.6°, B = 70.6°, C= 51.8°