Answer to Question #177551 in Trigonometry for Sree

Let "AH" is the length from the Golfer to the perpendicular going off to the ball, "CA = 170" m, "BA = 195" m, "\\angle {A} = 10\\degree".

"CB" is the distance between the ball and the hole.

1) Using right triangle trigonometry: "\\cos{x} = \\frac {adjacent}{hypotenuse}" and "adjacent = hypotenuse *\\cos{x}".

Then "AH = CA * \\cos{\\angle {A} } = 170 * \\cos{10\\degree } = 167,4" m.

2) Using Pythagorean's theorem "a^2+b^2=\u0441^2".

Then "CH^2 + AH^2 = CA^2"

"CH = \\sqrt {CA^2 - AH^2}"

"CH = \\sqrt {170^2 - 167,4^2} = 29,5" m

3) "BH = BA - AH"

"BH = 195 - 167,4 = 27,6" m

4) Using Pythagorean's theorem "a^2+b^2=\u0441^2".

Then "CH^2 + BH^2 = CB^2"

"CB = \\sqrt {CH^2 + BH^2}"

"CB = \\sqrt {29,5^2 + 27,6^2} = 40,4" m

Hence the distance between the ball and the hole is 40,4 m.