Find the smallest number by which 5400 s...

Find the smallest number by which 5400 should be multiplied so that the product is a perfect cube The following are the steps involves in solving the above problem .Arrange them in sequential order (A) `rarr 5400=2^(3)xx3^(3)xx5^(2)` (B) on prime factorisation of 5400 we get 5400= `2xx2xx2xx5xx5xx3xx3xx3` (C ) `therefore` 5400 must be multipled by 5 so that the porduct is a perfect cube (D) In the prime factorisation of 5400 we observe that 5 has not appeared n times where n is a multiple of 3

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Find the smallest number by which 2592 should be divided so that the quotient is a perfect cube The folloiwng are the steps involved in solving the above problem .Arrange them in sequential order (A) On prime factorisation 2592 = 2^(5)xx3^(4) (B) 2592 should be divided by 12 so that the quotient is a perfect cube (C ) Now 2592 = (6)^(3)xx12

What is the least number which must be multiplied to 5400 to get a perfect square?

What is the least number which must be multiplied to 5400 to get a perfect square ?

Find 5xx9xx2xx2xx3xx5

2 xx x xx 3 xx 5 xx y is a prime factorisation of 120 then x – y = ?

hcf of 3^(3)xx5 and 3^(2)xx5^(2)

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