Exercise 6 Page 304

Now, let's take a look at the statements that need to be completed one at a time.

Blank a.

The first blank asks us to state why ∠ 1 and ∠ 3, as well as ∠2 and ∠3, are complementary. That is part of the given information. Statement: & ∠ 1 and ∠ 3 are complementary & ∠2 and∠3 are complementary Reason: & a. Given

Blank b.

Now, let's take a look at the second blank. This wants to know why m∠ 1+m∠ 3=90 and m∠ 2+m∠ 3=90. This is from the definition of complementary angles. Statement: & m∠ 1 + m∠ 3=90 & m∠ 2 + m∠ 3=90 Reason: & b. Definition of comp. angles

Blank c.

The third line in the proof table is looking at a new equation m∠ 1+m∠ 3=m∠ 2+m∠ 3. This is obtained by substituting the second equation from b into the first equation. Both equations are equal to 90^(∘), and therefore are equal to one another. Statement: & m∠ 1 + m∠ 3= m∠ 2 + m∠ 3 Reason: & c. Substitution Property

Blank d.

The fourth blank wants to know what algebraic statement can be obtained by using the Reflexive Property. From part c, we can see that the common term on both sides is m∠ 3. Statement: & d. m∠ 3 = m∠ 3 Reason: & Reflexive Property

Blank e.

The next space asks why m∠ 1=m∠ 2. This is found by subtracting m∠ 3 from both sides of the equation in part c. Statement: & m∠ 1 = m∠ 2 Reason: & e. Subtraction Property

Blank f.

The sixth and final blank asks us why ∠ 1 ≅ ∠ 2. This is ultimately what we wanted to prove. This is obtained from the previous part by using the definition of congruent angles. Statement: & ∠ 1 ≅ ∠ 2 Reason: & f. Definition of congruent angles

Completed Proof

Below, we present the given table with all the blanks filled in.