Here are the evaluated expressions: • (–5) + 0 = –5 (Adding zero keeps the same value). • 7 + (–7) = 0 (Opposites cancel each other). • (–10) + 20 = 10 (20 steps right from –10 reaches +10). • 10 – 20 = –10 (Moving 20 steps left from 10 reaches –10). • 7 – (–7) = 14 (Subtracting –7 is like adding +7Read more
Here are the evaluated expressions:
• (–5) + 0 = –5 (Adding zero keeps the same value).
• 7 + (–7) = 0 (Opposites cancel each other).
• (–10) + 20 = 10 (20 steps right from –10 reaches +10).
• 10 – 20 = –10 (Moving 20 steps left from 10 reaches –10).
• 7 – (–7) = 14 (Subtracting –7 is like adding +7).
• (–8) – (–10) = 2 (Moving 2 right from –10 reaches –8).
Subtraction can always be converted to addition by changing the sign of the number being subtracted. For example, 7 – (–3) becomes 7 + 3, giving 10. This works because subtracting a negative number means moving to the right on the number line, similar to adding a positive number. This rule simplifieRead more
Subtraction can always be converted to addition by changing the sign of the number being subtracted. For example, 7 – (–3) becomes 7 + 3, giving 10. This works because subtracting a negative number means moving to the right on the number line, similar to adding a positive number. This rule simplifies integer calculations, especially when working with negative values in mathematical expressions.
To add +5 and –8 using tokens, place 5 positive tokens and 8 negative tokens. Cancel out 5 positive and 5 negative tokens, as they form zero pairs. This leaves 3 negative tokens. Therefore, (+5) + (–8) = –3. The concept of zero pairs simplifies integer addition by removing equal positive and negativRead more
To add +5 and –8 using tokens, place 5 positive tokens and 8 negative tokens. Cancel out 5 positive and 5 negative tokens, as they form zero pairs. This leaves 3 negative tokens. Therefore, (+5) + (–8) = –3. The concept of zero pairs simplifies integer addition by removing equal positive and negative values, leaving only the remaining unmatched tokens.
What are the results of expressions like –5 + 0, 7 + (–7), and others?
Here are the evaluated expressions: • (–5) + 0 = –5 (Adding zero keeps the same value). • 7 + (–7) = 0 (Opposites cancel each other). • (–10) + 20 = 10 (20 steps right from –10 reaches +10). • 10 – 20 = –10 (Moving 20 steps left from 10 reaches –10). • 7 – (–7) = 14 (Subtracting –7 is like adding +7Read more
Here are the evaluated expressions:
• (–5) + 0 = –5 (Adding zero keeps the same value).
• 7 + (–7) = 0 (Opposites cancel each other).
• (–10) + 20 = 10 (20 steps right from –10 reaches +10).
• 10 – 20 = –10 (Moving 20 steps left from 10 reaches –10).
• 7 – (–7) = 14 (Subtracting –7 is like adding +7).
• (–8) – (–10) = 2 (Moving 2 right from –10 reaches –8).
For more NCERT Solutions for Class 6 Math Chapter 10 The Other Side of Zero Extra Questions and Answer:
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Use the unmarked number line to evaluate expressions like –125 + (–30), +105 – (–55), and others.
Evaluating these expressions using an unmarked number line: • (–125) + (–30) = –155 (Moving 30 steps left from –125). • (+105) – (–55) = +160 (Subtracting –55 becomes adding +55). • (+80) – (–150) = +230 (Adding +150 to +80). • (–99) – (–200) = +101 (Subtracting –200 becomes adding +200). The unmarkRead more
Evaluating these expressions using an unmarked number line:
• (–125) + (–30) = –155 (Moving 30 steps left from –125).
• (+105) – (–55) = +160 (Subtracting –55 becomes adding +55).
• (+80) – (–150) = +230 (Adding +150 to +80).
• (–99) – (–200) = +101 (Subtracting –200 becomes adding +200).
The unmarked number line helps visualize these movements, simplifying integer operations using directional movement.
For more NCERT Solutions for Class 6 Math Chapter 10 The Other Side of Zero Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Can you always convert subtraction to addition? How?
Subtraction can always be converted to addition by changing the sign of the number being subtracted. For example, 7 – (–3) becomes 7 + 3, giving 10. This works because subtracting a negative number means moving to the right on the number line, similar to adding a positive number. This rule simplifieRead more
Subtraction can always be converted to addition by changing the sign of the number being subtracted. For example, 7 – (–3) becomes 7 + 3, giving 10. This works because subtracting a negative number means moving to the right on the number line, similar to adding a positive number. This rule simplifies integer calculations, especially when working with negative values in mathematical expressions.
For more NCERT Solutions for Class 6 Math Chapter 10 The Other Side of Zero Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Add +5 and –8 using tokens.
To add +5 and –8 using tokens, place 5 positive tokens and 8 negative tokens. Cancel out 5 positive and 5 negative tokens, as they form zero pairs. This leaves 3 negative tokens. Therefore, (+5) + (–8) = –3. The concept of zero pairs simplifies integer addition by removing equal positive and negativRead more
To add +5 and –8 using tokens, place 5 positive tokens and 8 negative tokens. Cancel out 5 positive and 5 negative tokens, as they form zero pairs. This leaves 3 negative tokens. Therefore, (+5) + (–8) = –3. The concept of zero pairs simplifies integer addition by removing equal positive and negative values, leaving only the remaining unmatched tokens.
For more NCERT Solutions for Class 6 Math Chapter 10 The Other Side of Zero Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Evaluate differences using tokens. Check that you get the same result as with other methods.
Evaluating differences using tokens: • (+10) – (+7) = +3 (Remove 7 positive tokens from 10, leaving 3). • (–8) – (–4) = –4 (Subtracting a negative is like adding the positive equivalent). • (–9) – (–4) = –5 (Same as adding +4 to –9). • (+9) – (+12) = –3 (Removing 12 positive tokens from 9 leaves –3)Read more
Evaluating differences using tokens:
• (+10) – (+7) = +3 (Remove 7 positive tokens from 10, leaving 3).
• (–8) – (–4) = –4 (Subtracting a negative is like adding the positive equivalent).
• (–9) – (–4) = –5 (Same as adding +4 to –9).
• (+9) – (+12) = –3 (Removing 12 positive tokens from 9 leaves –3).
Using tokens visually confirms subtraction rules and ensures consistency with integer operations.
For more NCERT Solutions for Class 6 Math Chapter 10 The Other Side of Zero Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/