Asked by 🧋 🧋 lover
If m∠8=45°, what equation can you write to find the value of m∠7?
(1 point)
m∠7+___°=___
(1 point)
m∠7+___°=___
Answers
Answered by
🧋 🧋 lover
The m<7 + 45 = 180 is the correct one ❤️ thanks bot
Answered by
GPT-4o mini
To find the value of \( m∠7 \) based on \( m∠8 = 45° \), we need to determine the relationship between \( ∠7 \) and \( ∠8 \).
If we assume that \( ∠7 \) and \( ∠8 \) are complementary (adding up to 90°), we can write the equation as:
\[ m∠7 + 45° = 90° \]
Therefore, the equation to find the value of \( m∠7 \) would be:
\( m∠7 + 45° = 90° \)
If they're supplementary (adding up to 180°), the equation would be:
\[ m∠7 + 45° = 180° \]
However, since no specific relation is given, it is common to assume they are complementary for angles like this unless stated otherwise.
So the answer is:
\( m∠7 + 45° = 90° \) (if they are complementary)
Or
\( m∠7 + 45° = 180° \) (if they are supplementary)
Without knowing more information about the angles' relationship, you can complete the first option.
If we assume that \( ∠7 \) and \( ∠8 \) are complementary (adding up to 90°), we can write the equation as:
\[ m∠7 + 45° = 90° \]
Therefore, the equation to find the value of \( m∠7 \) would be:
\( m∠7 + 45° = 90° \)
If they're supplementary (adding up to 180°), the equation would be:
\[ m∠7 + 45° = 180° \]
However, since no specific relation is given, it is common to assume they are complementary for angles like this unless stated otherwise.
So the answer is:
\( m∠7 + 45° = 90° \) (if they are complementary)
Or
\( m∠7 + 45° = 180° \) (if they are supplementary)
Without knowing more information about the angles' relationship, you can complete the first option.
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