Question

A supercomputer picks a number from 1 to 1 million.If it is known that the number is not a perfect square which of the following cannot be its number of factors?​

Answer 1

Answer:

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Answer 2

CORRECT QUESTION:

A Supercomputer picks, a number from 1 to 1, million if it is known that the number isn't a perfect square. Which of the following cannot be its number factors a. 33 b.66 c. 36 d. 42

ANSWER:

The required option for the question above is c.$36.$

Step-by-step explanation:

Given: A supercomputer that picks a number from $1 to 1$ $million.$

To find That the number chosen by the supercomputer is not a perfect square.

Solution:

• Let the number be x.
• Let us first find out from the options given which is a perfect square.
• As the two sentences contradict each other by saying that the number should not be the perfect square along with what cannot be the factor.
• Therefore, the correct answer will actually be the perfect square.
• A perfect square if the number is x is x multiplied by x.
• So the only number that satisfies this condition from the options given is $36.$
• As it can be written as $6$ ×$6$.
• Therefore, from the above, it can be seen that the correct answer is c.$36$.

PROJECT CODE: #SPJ3