Two angles and a side must be congruent in the ASA congruent theorem
The information is not sufficient to prove that the triangles ABC and LMN are congruent through ASA
<h3>How to determine the congruent statements?</h3>
The triangles are given as:
Triangles ABC and LMN
The congruent sides and angles are
∠A ≅ ∠L, ∠B ≅ ∠M, and ∠C ≅ ∠N
In the above statement, only the angles of both triangles are shown to be congruent.
For two triangles to be congruent by ASA, two angles and a side must be congruent.
Hence, the information is not sufficient to prove that the triangles ABC and LMN are congruent through ASA
Read more about congruent triangles at:
brainly.com/question/1675117
The balance after the withdrawals and deposits is $52.60
The sum of these two angles is 180°, therefore,
138° + (x + 8)° = 180°.
Simplify the left side of the equation.
146° + x = 180°.
Subtract 146 from both sides.
x = 34°
Answer:
KArl should use 3/16 cups of chili powder
Step-by-step explanation:
Given that:
Recipe's requirement : 3/8 cups
Karl wants to use half : 1/2
The given question involves fractions. When the number of cups has to be divided into half, it will be multiplied with 1/2.
So,
Multiplying the chili powder requirement of the recipe to 1/2
Hence,
KArl should use 3/16 cups of chili powder
4 x 300 = 1200
0.58 x 90 = 52.2
1200 + 52.2 = 1252.2