noah tried to prove that $cos( heta) = sin( heta)$ using the following diagram. his proof is not correct.

|statement|reason|
| ---- | ---- |
|1 $mangle b = heta$|the acute angles in a right triangle are congruent.|
|2 $sin( heta) = \frac{ab}{bc}$|definition of sine.|
|3 $cos(mangle b) = \frac{ab}{bc}$|definition of cosine.|
|4 $cos( heta) = \frac{ab}{bc}$|substitution.|
|5 $cos( heta) = sin( heta)$|substitution|

what is the first mistake in noahs proof?
choose 1 answer:
a) angles $angle b$ and $angle c$ are complementary, not congruent.
b) noah used the wrong sides in his ratio for $sin( heta)$.
c) noah used the wrong sides in his ratio for

Question

noah tried to prove that $cos(	heta) = sin(	heta)$ using the following diagram. his proof is not correct.

|statement|reason|
| ---- | ---- |
|1 $mangle b = 	heta$|the acute angles in a right triangle are congruent.|
|2 $sin(	heta) = \frac{ab}{bc}$|definition of sine.|
|3 $cos(mangle b) = \frac{ab}{bc}$|definition of cosine.|
|4 $cos(	heta) = \frac{ab}{bc}$|substitution.|
|5 $cos(	heta) = sin(	heta)$|substitution|

what is the first mistake in noahs proof?
choose 1 answer:
a) angles $angle b$ and $angle c$ are complementary, not congruent.
b) noah used the wrong sides in his ratio for $sin(	heta)$.
c) noah used the wrong sides in his ratio for

Accepted Answer

# Brief Explanations:
El primer error está en el primer paso: en un triángulo rectángulo, los ángulos agudos son complementarios (suman 90°), no congruentes (iguales). Esto invalida la afirmación inicial que $m\angle B = 	heta$.
# Answer:
A. Angles $\angle B$ and $\angle C$ are complementary, not congruent.

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QUESTION IMAGE

Question

Explanation:

Answer:

statement	reason
2 $sin(\theta) = \frac{ab}{bc}$	definition of sine.
3 $cos(mangle b) = \frac{ab}{bc}$	definition of cosine.
4 $cos(\theta) = \frac{ab}{bc}$	substitution.
5 $cos(\theta) = sin(\theta)$	substitution