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One interior angle of a triangle is \(48^{\circ}\), and the other two angles are congruent. Choose the equation that could be used to determine the degree measure of one of the congruent angles.

A. \(x - 48 = 90\)
B. \(x + 48 = 180\)
C. \(2x - 48 = 90\)
D. [tex]\(2x + 48 = 180\)[/tex]

Sagot :

GinnyAnswer
Let's determine the correct equation step-by-step, knowing that one of the interior angles of the triangle is \(48^\circ\) and the other two angles are congruent.

1. Sum of Interior Angles:
- The sum of the interior angles of any triangle is always \(180^\circ\).

2. Representation of Angles:
- Let's denote the measure of each of the congruent angles as \(x\).

3. Equation Setup:
- Given that one angle is \(48^\circ\) and the other two angles are congruent, the equation representing the sum of the angles in the triangle will be:
[tex]\[ 48^\circ + x + x = 180^\circ \][/tex]
- Simplifying this equation:
[tex]\[ 48^\circ + 2x = 180^\circ \][/tex]

4. Correct Equation:
- Rearrange the simplified equation to isolate \(2x\):
[tex]\[ 2x + 48 = 180 \][/tex]

Thus, the equation that could be used to determine the degree measure of one of the congruent angles is:

[tex]\[ 2x + 48 = 180 \][/tex]

This matches the fourth option provided:

[tex]\[ 2x + 48 = 180 \][/tex]
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