Verify the following. 15×[6+(-3)]=[15×6]+[15×(-3)]
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LHS=15×(6+(-3))
= 15×(3)
=45
RHS=(15×6)+(15×(-3))
=90+(-45)
=45
that mins LHS=RHS
it is verified
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Answer:
Step-by-step explanation:
The given expression is : 15×[6+(-3)]=[15×6]+[15×(-3)]
L.H.S ⇒ 15×[6+(-3)]
= 15 × [ 6 - 3]
= 15 × [3]
= 15 × 3
= 45 ................................................(1)
R.H.S ⇒ [15×6]+[15×(-3)]
= [ 90 ] + [ -45 ]
= 90 - 45
= 45 ...............................................(2)
As, the value of L.H.S = the value of R.H.S =45
It is verified that 15×[6+(-3)]=[15×6]+[15×(-3)]
- To verify the given expression 15×[6+(-3)]=[15×6]+[15×(-3)], we can use distributive law .
- Distributive law or distributive property is used for relating the operations of multiplication and addition.
- It stated symbolically as a(b + c) = ab + ac; that is, the monomial factor a is distributed to each term of the binomial factor b + c, resulting in the product ab + ac.
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