Advertisements
Advertisements
प्रश्न
There are 5 teachers and 20 students. Out of them a committee of 2 teachers and 3 students is to be formed. Find the number of ways in which this can be done. Further find in how many of these committees a particular student is excluded?
उत्तर
The number of teachers = 5
Number of students = 20
The number of ways of selecting 2 teachers from 5 teachers is
= 5C2 ways.
= `(5!)/(2! xx (5 - 2)!)`
= `(5!)/(2! xx 3!)`
= `(5 xx 4 xx 3!)/(2! xx 3!)`
= `(5 xx 4)/(2 xx 1)`
= 10 ways
The number of ways of selecting 3 students from 20 students is
= 20C3
= `(20!)/(3! xx (20 - 3)!)`
= `(20!)/(3! xx 17!)`
= `(20 xx 19 xx 18 xx 17!)/(3! xx 17!)`
= `(20 xx 19 xx 18)/(3 xx 2 xx 1)`
= 20 × 19 × 3
= 1140 ways
∴ The total number of selection of the committees with 2 teachers and 5 students is
= 10 × 1140
= 11400
A particular student is excluded.
The number of ways of selecting 2 teachers from 5 teachers is
= 5C2
= `(5!)/(2! xx (5 - 2)!)`
= `(5!)/(2! xx 3!)`
= `(5 xx 4 xx 3!)/(2! xx 3!)`
= `(5 xx 4)/(2 xx 1)`
= 5 × 2
= 10
A particular student is excluded
∴ The number of remaining students = 19
Number of ways of selecting 3 students from 19 students
= 19C3
= `(19!)/(3! xx (19 - 3)!)`
= `(19!)/(3! xx 16!)`
= `(19 xx 18 xx 17 xx 16!)/(3! xx 16!)`
= `(19 xx 18 xx 17)/(3!)`
= `(19 xx 18 xx 17)/(3 xx 2 xx 1)`
= 19 × 3 × 17
= 969
∴ The required number of committees
= 10 × 969
= 9690
APPEARS IN
संबंधित प्रश्न
Out of 7 consonants and 4 vowels, how many words of 3 consonants and 2 vowels can be formed?
In how many ways can a cricket team of 11 players be chosen out of a batch of 15 players?
- There is no restriction on the selection.
- A particular player is always chosen.
- A particular player is never chosen.
The number of ways selecting 4 players out of 5 is
If nPr = 720(nCr), then r is equal to:
The number of diagonals in a polygon of n sides is equal to
Thirteen guests have participated in a dinner. The number of handshakes that happened in the dinner is:
If `""^(("n" + 1))"C"_8 : ""^(("n" - 3))"P"_4` = 57 : 16, find the value of n
There are 15 persons in a party and if each 2 of them shakes hands with each other, how many handshakes happen in the party?
In a parking lot one hundred, one-year-old cars, are parked. Out of them five are to be chosen at random for to check its pollution devices. How many different set of five cars can be chosen?
A trust has 25 members. How many ways 3 officers can be selected?
How many ways a committee of six persons from 10 persons can be chosen along with a chair person and a secretary?
How many different selections of 5 books can be made from 12 different books if, Two particular books are never selected?
Determine the number of 5 card combinations out of a deck of 52 cards if there is exactly three aces in each combination
A box contains two white balls, three black balls and four red balls. In how many ways can three balls be drawn from the box, if at least one black ball is to be included in the draw?
There are 11 points in a plane. No three of these lie in the same straight line except 4 points which are collinear. Find the number of triangles that can be formed for which the points are their vertices?
Choose the correct alternative:
The number of ways in which a host lady invite 8 people for a party of 8 out of 12 people of whom two do not want to attend the party together is
Choose the correct alternative:
If 10 lines are drawn in a plane such that no two of them are parallel and no three are concurrent, then the total number of points of intersection are
Choose the correct alternative:
If nC4, nC5, nC6 are in AP the value of n can be
