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-Supply Missing Statements and Missing Reasons for the Proof of This

Question 12

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-Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6.
-Supply missing statements and missing reasons for the proof of this theorem.
"The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two
right triangles that are similar to each other."
Given: Right triangle ABC with rt. -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. ; -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. Prove: -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. S1. R1.
S2. -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. R2.
S3. -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. and -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. are comp. R3. The acute angles of a rt. -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. are comp.
S4. -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. and -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. are comp. R4.
S5. R5. If 2 -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. s are comp. to the same -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. , these -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. are -Supply missing statements and missing reasons for the proof of this theorem. The altitude drawn to the hypotenuse of a right triangle separates the right triangle into two right triangles that are similar to each other. Given: Right triangle ABC with rt. ; Prove: S1. R1. S2. R2. S3. and are comp. R3. The acute angles of a rt. are comp. S4. and are comp. R4. S5. R5. If 2 s are comp. to the same , these are . S6. R6. .
S6. R6.

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