Difference between revisions of "Base Angle Theorem"
Toinfinity (talk | contribs) (Added another proof based on Law of Sines) |
Toinfinity (talk | contribs) m (Changed from "an angle of $0^{\circ}$ to $C=0^{\circ}$) |
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== Even Simpler Proof == | == Even Simpler Proof == | ||
− | By the [[Law of Sines]], we have <math>\tfrac{a}{\sin(A)}=\tfrac{b}{\sin(B)}</math>. We know <math>a=b</math>, so <math>\sin(A)=\sin(B)</math>. Then either <math>A=B</math> or <math>A=180-B</math>, but the second case would imply | + | By the [[Law of Sines]], we have <math>\tfrac{a}{\sin(A)}=\tfrac{b}{\sin(B)}</math>. We know <math>a=b</math>, so <math>\sin(A)=\sin(B)</math>. Then either <math>A=B</math> or <math>A=180-B</math>, but the second case would imply <math>C=0^{\circ}</math>, so <math>A=B</math>. |
[[Category:Theorems]] | [[Category:Theorems]] | ||
[[Category:Geometry]] | [[Category:Geometry]] |
Revision as of 12:16, 22 April 2020
The Base Angle Theorem states that in an isosceles triangle, the angles opposite the congruent sides are congruent.
Proof
Since the triangle only has three sides, the two congruent sides must be adjacent. Let them meet at vertex .
Now we draw altitude to . From the Pythagorean Theorem, , and thus is congruent to , and .
Simpler Proof
We know that (given). By the reflexive property, we know that . We know that (given). By SSS, we conclude that . By CPCTC, we conclude that .
Even Simpler Proof
By the Law of Sines, we have . We know , so . Then either or , but the second case would imply , so .