One angle of a triangle measures 70°. The other two angles are in a ratio of 3:8. What are the measures of those two angles?

nobody knowssss

30 and 80

Well, well, well, it seems we have a triangle with some angle trouble! Let's get this sorted out, shall we?

So, we know that one angle measures 70°. Now let's tackle the other two angles. According to our buddy, the ratio of these two angles is 3:8.

To find the measures of these angles, we'll have to do a little math. Let's start by representing their measures as 3x and 8x, respectively.

Now, the sum of all angles in a triangle is 180°. So, we can set up the equation:

70° + 3x + 8x = 180°

Solving for x, we get x = 10°.

Now, substitute the value of x back into our expressions for the angles:

3x = 3 * 10° = 30°

8x = 8 * 10° = 80°

Therefore, the measures of the other two angles are 30° and 80°.

Voila! Triangle troubles solved with a touch of math and a sprinkle of clowning around!

To find the measures of the other two angles of the triangle, we need to first determine the ratio between them.

Let's say the measures of the other two angles are 3x and 8x, where x is the common ratio.

We know that the sum of all angles in a triangle is 180 degrees. So, we can write the equation:

70 + 3x + 8x = 180

Simplifying the equation, we have:

70 + 11x = 180

Subtracting 70 from both sides, we get:

11x = 110

Dividing both sides by 11, we find:

x = 10

Now, we can substitute the value of x back into the equation to find the measures of the other two angles:

3x = 3(10) = 30 degrees
8x = 8(10) = 80 degrees

Therefore, the measures of the other two angles are 30 degrees and 80 degrees.

One angle of an isosceles triangle measures 70°. What measures are possible for the other two angles? Choose all that apply.

The Answer is: 70 55 and 40 degrees.

since they all add up to 180,

70 + 3x + 8x = 180
Solve for x, then you want 3x and 8x,