10. Find the values of the angles x, y, and z.
Possible Answers are:
A: x = 80°; y = 140°; z = 20°
B: x = 70°; y = 130°; z = 30°
C: x = 80°; y = 50°; z = 110°
D: x = 100°; y= 140°; z = 40°
Please explain the correct answer!
A: x = 80°; y = 140°; z = 20°
both need triangles need to equal 180°
60 + 40 + 80 = 180
20 + 20 + 140 = 180
there's your flashy answer in a flashy way
Pls I. Need help ASAP
To find the values of angles x, y, and z, we need to analyze the given information.
Let's consider the possible answers one by one and see if they satisfy the given conditions:
A: x = 80°; y = 140°; z = 20°
In a triangle, the sum of all angles is 180°. If we add up the values of x, y, and z from option A, we get 240°, which means this option is not correct.
B: x = 70°; y = 130°; z = 30°
Adding up the values of x, y, and z from option B, we get 230°. Again, this sum is greater than 180°, so option B is not correct.
C: x = 80°; y = 50°; z = 110°
When we add up the values of x, y, and z from option C, we get 240°. This sum is also greater than 180°, so option C is incorrect.
D: x = 100°; y = 140°; z = 40°
Adding up the values of x, y, and z from option D, we get 280°. Since this sum exceeds 180°, option D is incorrect as well.
Since none of the given options satisfy the condition that the sum of the angles in a triangle is 180°, none of the options are correct. It is possible that none of the provided answer choices correspond to the correct values of x, y, and z.