Question

Under root 147 upon 75 is not a rational no. Justify your answer

Answer 1

Answer:

The given fraction is a rational number.

So, The given statement is False.

Step-by-step explanation:

The number is given to be :

$\frac{\sqrt{147}}{\sqrt{75}}$

Now, making prime factors of the numbers present in the numerator and denominator.

$\frac{\sqrt{147}}{\sqrt{75}}\\\\\implies \frac{\sqrt{3\times 7\times 7}}{\sqrt{3\times 5\times 5}}\\\\\implies \frac{7\sqrt{3}}{5\sqrt{3}}\\\\\implies \frac{7}{5}\\\\\implies 1.4$

Since, the fraction can be represented in the form of p by q and also the fraction is a terminating decimal.

Therefore, The given fraction is a rational number.

Thus, the given statement is False.

Answer 2

Answer:

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