The total number of integral solutions of the equation $xyz = 24$ is
- A$30$
- B$120$
- C$85$
- D$60$
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The number of $3$-$digit$ odd numbers,whose sum of digits is a multiple of $7$,is
DifficultJEE MAIN 2022
View SolutionLet $S = \{1, 2, 3, 4, 5, 6, 7, 8, 9\}$. Let $x$ be the number of $9$-digit numbers formed using the digits of the set $S$ such that only one digit is repeated and it is repeated exactly twice. Let $y$ be the number of $9$-digit numbers formed using the digits of the set $S$ such that only two digits are repeated and each of these is repeated exactly twice. Then,
DifficultJEE MAIN 2026
View SolutionAll the letters of the word $ANIMAL$ are permuted in all possible ways and the permutations thus formed are arranged in dictionary order. If the rank of the word $ANIMAL$ is $x$,then the permutation with rank $x$,among the permutations obtained by permuting the letters of the word $PERSON$ and arranging the permutations thus formed in dictionary order is
In a high school,a committee has to be formed from a group of $6$ boys $M_1, M_2, M_3, M_4, M_5, M_6$ and $5$ girls $G_1, G_2, G_3, G_4, G_5$.
$(i)$ Let $\alpha_1$ be the total number of ways in which the committee can be formed such that the committee has $5$ members,having exactly $3$ boys and $2$ girls.
$(ii)$ Let $\alpha_2$ be the total number of ways in which the committee can be formed such that the committee has at least $2$ members,and having an equal number of boys and girls.
$(iii)$ Let $\alpha_3$ be the total number of ways in which the committee can be formed such that the committee has $5$ members,at least $2$ of them being girls.
$(iv)$ Let $\alpha_4$ be the total number of ways in which the committee can be formed such that the committee has $4$ members,having at least $2$ girls and such that both $M_1$ and $G_1$ are $NOT$ in the committee together.
$LIST-I$ $LIST-II$ $P$. The value of $\alpha_1$ is $1. 136$ $Q$. The value of $\alpha_2$ is $2. 189$ $R$. The value of $\alpha_3$ is $3. 192$ $S$. The value of $\alpha_4$ is $4. 200$ $5. 381$ $6. 461$
The correct option is:
$(i)$ Let $\alpha_1$ be the total number of ways in which the committee can be formed such that the committee has $5$ members,having exactly $3$ boys and $2$ girls.
$(ii)$ Let $\alpha_2$ be the total number of ways in which the committee can be formed such that the committee has at least $2$ members,and having an equal number of boys and girls.
$(iii)$ Let $\alpha_3$ be the total number of ways in which the committee can be formed such that the committee has $5$ members,at least $2$ of them being girls.
$(iv)$ Let $\alpha_4$ be the total number of ways in which the committee can be formed such that the committee has $4$ members,having at least $2$ girls and such that both $M_1$ and $G_1$ are $NOT$ in the committee together.
| $LIST-I$ | $LIST-II$ |
| $P$. The value of $\alpha_1$ is | $1. 136$ |
| $Q$. The value of $\alpha_2$ is | $2. 189$ |
| $R$. The value of $\alpha_3$ is | $3. 192$ |
| $S$. The value of $\alpha_4$ is | $4. 200$ |
| $5. 381$ | |
| $6. 461$ |
The correct option is:
The sum of all possible numbers that can be formed by using the digits $2, 3, 5, 7$ without repetition of digits is
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