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Answers
Answer:
30 degrees
Step-by-step explanation:
To get started, draw line segment BG such that CBG is equal to 20 degrees.
In triangle CBG, we know one angle is 20 degrees and other is 80 degrees, for a total of 100 degrees. So the triangle’s angles sum to 180, we can solve that ∠CGB = 80 degrees. This means triangle CBG is an isosceles triangle, and BC = BG.
Angles CBG and BGE form a straight line so they must add up to 180 degrees. This means angle BGE equals 100 degrees.
Then, focusing on triangle BGE, we can solve that ∠BEG = 40 degrees, because it has to be 180 minus the known angles of 40 and 100. Triangle BGE has two angles equal to 40 degrees, so this is another isosceles triangle, so BG = GE.
Then, focusing on triangle BFC, we can solve that ∠BFC = 50 degrees, which means triangle BFC is another isosceles triangle. This means BF = BC.
We have proven BC = BG = GE = BF.
Now we create another triangle BFG. Since BG = BF, we know the opposite angles must be equal.
The third angle in the triangle, ∠GBF, is 60 degrees, so the remaining angles have to be half of 180 – 60. This is (180 – 60)/2 = 60 degrees. In other words, all 3 angles are equal so BFG is an equilateral triangle. All of its sides must be equal, so GF = BF.
We have figured out a lot of information. There is just one more triangle that is necessary to consider, so below is a diagram focusing on triangle GFE that omits the non-essential information.
We know GF = GE, so we once again have an isosceles triangle, and we know the vertex angle is equal to 40 degrees. This means the remaining angles are one-half of 180 – 40, which is 70 degrees.
Finally, we know that 40 + x has to be equal to 70, so that means x = 30 degrees.