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632×2+(-98)×(-632) using distribute property
? Related: NCERT Solutions(Part - 1) - Integers
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632×2+(-98)×(-632) using distribute property Related: NCERT Solutions...
**Using the Distributive Property**
To simplify the expression 632×2 (-98)×(-632), we can apply the distributive property. The distributive property states that for any three numbers a, b, and c, the product of a and the sum of b and c is equal to the sum of the products of a and b, and a and c. In other words:
a × (b + c) = (a × b) + (a × c)
In this case, we can simplify the expression step by step using the distributive property.
1. First, let's break down the expression into two parts: 632×2 and (-98)×(-632).
a) 632×2 can be simplified as follows:
632×2 = 1264
b) (-98)×(-632) can be simplified as follows:
(-98)×(-632) = (-98) × 632
2. Now, let's apply the distributive property to (-98) × 632:
(-98) × 632 = (-98) × (600 + 32)
Applying the distributive property:
= (-98) × 600 + (-98) × 32
= -58800 + (-3136)
= -61936
3. Finally, let's substitute the simplified values back into the original expression:
632×2 (-98)×(-632) = 1264 + (-61936)
= -60672
**Final Answer:**
The simplified form of the expression 632×2 (-98)×(-632) using the distributive property is -60672.
To simplify the expression 632×2 (-98)×(-632), we can apply the distributive property. The distributive property states that for any three numbers a, b, and c, the product of a and the sum of b and c is equal to the sum of the products of a and b, and a and c. In other words:
a × (b + c) = (a × b) + (a × c)
In this case, we can simplify the expression step by step using the distributive property.
1. First, let's break down the expression into two parts: 632×2 and (-98)×(-632).
a) 632×2 can be simplified as follows:
632×2 = 1264
b) (-98)×(-632) can be simplified as follows:
(-98)×(-632) = (-98) × 632
2. Now, let's apply the distributive property to (-98) × 632:
(-98) × 632 = (-98) × (600 + 32)
Applying the distributive property:
= (-98) × 600 + (-98) × 32
= -58800 + (-3136)
= -61936
3. Finally, let's substitute the simplified values back into the original expression:
632×2 (-98)×(-632) = 1264 + (-61936)
= -60672
**Final Answer:**
The simplified form of the expression 632×2 (-98)×(-632) using the distributive property is -60672.
Community Answer
632×2+(-98)×(-632) using distribute property Related: NCERT Solutions...
=632x(-2)+(-98)x632
=632x[(-2)+(-98)]
=632x(-100)
=-63200
DISTRIBUTIVE PROPERTY
=632x[(-2)+(-98)]
=632x(-100)
=-63200
DISTRIBUTIVE PROPERTY
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632×2+(-98)×(-632) using distribute property Related: NCERT Solutions(Part - 1) - Integers?
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632×2+(-98)×(-632) using distribute property Related: NCERT Solutions(Part - 1) - Integers? for Class 7 2024 is part of Class 7 preparation. The Question and answers have been prepared according to the Class 7 exam syllabus. Information about 632×2+(-98)×(-632) using distribute property Related: NCERT Solutions(Part - 1) - Integers? covers all topics & solutions for Class 7 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for 632×2+(-98)×(-632) using distribute property Related: NCERT Solutions(Part - 1) - Integers?.
632×2+(-98)×(-632) using distribute property Related: NCERT Solutions(Part - 1) - Integers? for Class 7 2024 is part of Class 7 preparation. The Question and answers have been prepared according to the Class 7 exam syllabus. Information about 632×2+(-98)×(-632) using distribute property Related: NCERT Solutions(Part - 1) - Integers? covers all topics & solutions for Class 7 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for 632×2+(-98)×(-632) using distribute property Related: NCERT Solutions(Part - 1) - Integers?.
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