The number of numbers between $2,000$ and $5,000$ that can be formed using the digits $0, 1, 2, 3, 4$ (repetition of digits is not allowed) which are multiples of $3$ is?

In how many different ways can the letters of the word $ALGEBRA$ be arranged in a row if:
$(I)$ The $2$ $A$s are together?
$(II)$ The $2$ $A$s are not together?

There are three bags $B_1$,$B_2$,and $B_3$ containing $2$ Red and $3$ White,$5$ Red and $5$ White,and $3$ Red and $2$ White balls respectively. $A$ ball is drawn from bag $B_1$ and placed in bag $B_2$,then a ball is drawn from bag $B_2$ and placed in bag $B_3$,then a ball is drawn from bag $B_3$. The number of ways in which this process can be completed,if the same colour balls are used in the first and second transfers (Assume all balls to be different) is

If $^{15}C_{3r} = ^{15}C_{r+3}$,then the value of $r$ is

How many numbers lying between $999$ and $10000$ can be formed with the help of the digits $0, 2, 3, 6, 7, 8$ when the digits are not to be repeated?

Out of $7$ consonants and $4$ vowels,how many words of $3$ consonants and $2$ vowels can be formed?