Find the smallest number by which 1323 must be multiplied so that the product is perfect cube.
Answers
Answer:
7
Step-by-step explanation:
first we have to factorise 1323
by factorising we got 3x3x3x7x7
to make it a perfect square we have to multiply with 7
Answer :-
The smallest number is 7.
Solution :-
To find the ‘smallest number’ by which 1323 will be multiplied, we need to factorize 1323 as under:
1323=3 \times 4411323=3×441
1323=3 \times 3 \times 1471323=3×3×147
1323=3 \times 3 \times 3 \times 491323=3×3×3×49
1323=3 \times 3 \times 3 \times 7 \times 71323=3×3×3×7×7
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The above can be written as 1323=3^{3} \times 7^{2}.1323=3
3
×7
2
.
Now, 7 is not in triplet. If 7 is in triplet, then derived number will be perfect cube.
Hence, 1323 must be ‘multiplied by 7’ to get a ‘perfect cube’ as shown below:
1323=3^{3} \times 7^{3}=21 \times 21 \times 21=92611323=3
3
×7
3
=21×21×21=9261 .