Verify the multiple of $9$ leaving $9$. Whether the number $9981$ is multiple of $9$ or not.

${\left(9\right)}^{11}\times {\left(5\right)}^7\times {\left(7\right)}^5\times {\left(3\right)}^2\times {\left(17\right)}^2$

Consider the number $N={12}^6\times 3^8\times 5^3$. Which of the following statements is/are correct?

$1$. The number of odd factors of $N$ is $60$.

$2$. The number of even factors of $N$ is $720$.

Select the correct answer using the code given below:

The prime factorisation of 240 is:

(A) $2^3\times$$3^2\times 5$ 

(B) $2^4\times 3^2\times 5$

(C) $2^4\times 3\times 5$

(D) $2^5\times 3\times 5$

Consider the following statements in respect of all factors of $360$:

1. The number of factors is $24$.

2. The sum of all factors is $1170$.

Which of the above statements is/are correct?

Which of the following statement(s) is/are true?

I. There are $12$ multiples of $9$ from $7$ to $109.$

II. There are $9$ multiples of $13$ from $19$ to $119.$

The total number of factors of 1156 is: 

(A) 9 

(B) 8 

(C) 10 

(D) 11 

The sum of all the factors of $156$ is: 
(A) $392$
(B) $235$
(C) $390$
(D) $379$

What is the number of Prime factor in ${15}^{18}$$\times$$4^{10}$$\times$$6^9$.

Find the first two common multiples of $3$ and $5$.

Find the first $5$ multiples of $5, 8$ and $12$.

Since, $7\times 3=21$, $21$ is a multiple of both $7$ and $3$.

Find the first two common multiples of $10$ and $5$.

Ring the numbers that are multiples of $3$. Put a square around the multiples of $5$. List their common multiples.

$1, 2, 3, 4, 5, 6, 7, 8, 9,10$

$11, 12, 13, 14, 15, 16, 17,18, 19, 20$

$21, 22, 23, 24, 25, 26, 27, 28, 29, 30$

Use the given number line to list the common multiples of $2$ and $4$.