Question
Write the opposite of the number in the given figure.
![](data:image/png;base64,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)
Write the opposite of the number in the given figure.
- -3
- 2
- -4
- -2
Hint:
Two numbers are said to opposites of each other , if their sum add up to 0.
The correct answer is: -2
The value given in the number line is 2. Let the opposite of 2 be x. So,
. Solving the equation, we have:
![2 plus x equals 0
x equals negative 2](data:image/png;base64,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)
Hence, the correct answer is option d.
Related Questions to study
Write the integer that represents the opposite of the real-world situation:
An atom’s positive charge of 7.
Write the integer that represents the opposite of the real-world situation:
An atom’s positive charge of 7.
Write the integer that represents the opposite of the real-world situation:
An atom’s positive charge of 7.
Write the integer that represents the opposite of the real-world situation:
An atom’s positive charge of 7.
Graph the opposite of the number shown on the number line.
![](data:image/png;base64,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)
Graph the opposite of the number shown on the number line.
![](data:image/png;base64,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)
Write the integer that represents the opposite of the real-world situation:
A deposit of $400.
Write the integer that represents the opposite of the real-world situation:
A deposit of $400.
Write the integer that represents the opposite of the real-world situation:
A deposit of $400.
Write the integer that represents the opposite of the real-world situation:
A deposit of $400.
A diver is 20 feet below sea level. An integer to represent the situation is _________
A diver is 20 feet below sea level. An integer to represent the situation is _________
Write the integer that represents the opposite of the real-world situation:
A raise of 450C.
Write the integer that represents the opposite of the real-world situation:
A raise of 450C.
Write the integer that represents the opposite of the real-world situation:
A raise of 450C.
Write the integer that represents the opposite of the real-world situation:
A raise of 450C.
Write an integer to match the following descriptions.
i. A debit of $40
ii. A deposit of $225
Write an integer to match the following descriptions.
i. A debit of $40
ii. A deposit of $225
Write the integer that represents the opposite of the real-world situation:
A loss of 13 pounds.
Write the integer that represents the opposite of the real-world situation:
A loss of 13 pounds.
Write the integer that represents the opposite of the real-world situation:
A loss of 13 pounds.
Write the integer that represents the opposite of the real-world situation:
A loss of 13 pounds.
The opposite number of – 5 is______
The opposite number of – 5 is______
The opposite number of 3 is______
The opposite number of 3 is______
The opposite number of – 12 is____
The opposite number of – 12 is____
The opposite of – 7.
The opposite of – 7.
The opposite of – 7.
The opposite of – 7.
An electron represents a negative charge, write an integer to represent 3 electrons.
An electron represents a negative charge, write an integer to represent 3 electrons.
An electron represents a negative charge, write an integer to represent 3 electrons.
An electron represents a negative charge, write an integer to represent 3 electrons.
The opposite number of – 3 is______
The opposite number of – 3 is______
Write the integer that represents the opposite of the situation: A withdrawal of $25.
Write the integer that represents the opposite of the situation: A withdrawal of $25.
Write the integer that represents the opposite of the situation: A withdrawal of $25.
Write the integer that represents the opposite of the situation: A withdrawal of $25.