According to the given data the m ∠1+m ∠2=m∠6+m∠ 7 proofed by symmetric property:
<h3>What is the significance of symmetric property ?</h3>
The symmetric property of equality is significant in mathematics because that tells us that both sides of either an equal sign are equal regardless of which side of the section they are on.
<h3>Who invented the symmetry property?</h3>
But it wasn't until the nineteenth century that mathematicians like Evariste Galois, an unhappy French genius, uncovered symmetries hidden in mathematical equation solutions.
<h3>According to the given data:</h3>
Given: ∠3 ≅ ∠5
Prove: m ∠1+m ∠2=m∠6+m∠ 7
Now ,
m ∠1+m ∠2=m∠6+m∠ 7..........(1)
m∠6+m∠ 7 = ∠3 + m∠4..............(2)
m ∠1+m ∠2 = ∠3 + m∠4
(subtracting)
m∠4 +m∠3 = m ∠3 + m∠4
symmetric property:
m ∠1+m ∠2=m∠6+m∠ 7
According to the given data the m ∠1+m ∠2=m∠6+m∠ 7 proofed by symmetric property:
To know more about symmetric property visit:
brainly.com/question/1527538
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