ifangle and its complimenton angle are in aratio of 2:3 – thenthen the smalles angle? About the author Ariana
The angles are 36° and 54° respectively. Step-by-step explanation: Correct Question: If the ratio between two complementary angles is 2:3, then find the angles. Given: Complementary angles are in the ratio of 2:3. To find: The angles. Solution: Let us assume the two angles as 2x and 3x respectively. ☯ Two angles are considered to be complementary angles if the sum of them is 90°. Therefore, ⇒ 2x + 3x = 90° ⇒ 5x = 90° ⇒ x = 18° Hence, the angles are: First Angle = 2x = 2 × 18 = 36° Second Angle = 3x = 3 × 18 = 54° Reply
[tex]{\huge{\boxed{\underline{\textbf{\textsf{\color{lightpink}{An}{\color{lightblue}{sw}{\color{lightgreen}{er}{\color{lightyellow}{:}}}}}}}}}}[/tex] To Solve: If angle and its compliment angle are in a ratio of 2:3 – then the smaller angle is Given: Ratio: 2:3 They complementary angles Solⁿ: Let the angles be 2x, 3x Sum of the angles is 90° are called complementary angles. Eqⁿ formed: 2x + 3x = 90° 5x = 90° x = 90/5 x = 18° ★ Complementary angles: 2x = 18×2 2x = 36° 3x = 18×3 3x = 54° We see, 2x = 36° is smaller angle. ㅤ ㅤ HOPE IT HELPS MARK BRAINLIEST PLS 🙂 Reply
The angles are 36° and 54° respectively.
Step-by-step explanation:
Correct Question:
If the ratio between two complementary angles is 2:3, then find the angles.
Given:
To find:
Solution:
Let us assume the two angles as 2x and 3x respectively.
☯ Two angles are considered to be complementary angles if the sum of them is 90°.
Therefore,
⇒ 2x + 3x = 90°
⇒ 5x = 90°
⇒ x = 18°
Hence, the angles are:
[tex]{\huge{\boxed{\underline{\textbf{\textsf{\color{lightpink}{An}{\color{lightblue}{sw}{\color{lightgreen}{er}{\color{lightyellow}{:}}}}}}}}}}[/tex]
To Solve:
Given:
Solⁿ:
Eqⁿ formed:
2x + 3x = 90°
5x = 90°
x = 90/5
x = 18°
★ Complementary angles:
2x = 18×2
2x = 36°
3x = 18×3
3x = 54°
We see, 2x = 36° is smaller angle.
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ㅤ
HOPE IT HELPS
MARK BRAINLIEST PLS 🙂