9. In the right triangle below, find the length of the side not given. x 185
X + 9 The length of the shortest side of the isosceles triangle is 6 inches. 3x + 3 Find the length of the two congruent sides. 5x + 5 in GEOMETRY IA If x = 35, is the triangle acute, right, or obtuse? 3(x - 15) 2(x - 5) X + 25
Solve the right triangle. 510 35 Find the length of the side opposite to the given angle. (Round your answer to two decimal places.) Find the length of the hypotenuse. (Round your answer to two decimal places.) Find the other acute angle. 0
For the following right triangle, find the side length x. Round your answer to the nearest hundredth. 7.21/
Find the length of the missing side of the right triangle. Round to three decimal places, if necessary. a= 12, c = 20
19/ X 141 22 Given the triangle a, find the length of side x using the Law of Cosines. Round your final answer to 4 decimal places.
Given the side length b = 9 and the angle B = 43 on the triangle below, find the lengths of a and c and the measure of angle A. Do not round during your calculations, but round your final answers to one decimal place. B 43°) a A 9 C Provide your answer below: -Dc = A=0
GE X + 9 The length of the shortest side of the isosceles triangle is 6 inches. 3x + 3 Find the length of the two congruent sides. 5x + 5 in.
Given triangle ABC shown, find the length of side a. Round to the nearest ronth. Hint: This is not a right triangle. You'll need to use the Law of Sines or Law of Cosines to solve for the missing side. 13 53 15 C
r the right triangle below, find the length of 1. Round to the hundredths. (2 decimal places) 40° 16 x Given the reference angle e' = 55° find the measure of 0 in standard position if its terminal side lies in: (a) quadrant 1: (b) quadrant II: (c) quadrant III: (d) quadrant IV:
Find the length of the missing side of the right triangle. Round to three decimal places, if necessary. The legs of the right triangle are represented by a and b, and the hypotenuse is represented by c. a = 10, C = 25 O A. b = 22.694 OB. b = 26.926 c. b = 22.913 OD. b = 615