Advertisements
Advertisements
प्रश्न
Answer the following:
A student finds 7 books of his interest but can borrow only three books. He wants to borrow the Chemistry part-II book only if Chemistry Part-I can also be borrowed. Find the number of ways he can choose three books that he wants to borrow.
Advertisements
उत्तर
There are 7 books of interest and only 3 books can be borrowed.
(i) If Chemistry part-I is selected, then Chemistry part-II is also borrowed. Thus the only a third book is selected from the remaining (7 – 2) = 5 books.
∴ the number of ways of selecting 3 books such that Chemistry part-I is selected
= 5C1
= 5
(ii) If Chemistry part-I is not selected, then Chemistry part-II is not borrowed, therefore, he has to select all 3 books from the remaining (7 – 2) = 5 books.
∴ the number of ways of selecting 3 books such that Chemistry part-I is not selected
= 5C3
= `(5!)/(3!2!)`
= `(5 xx 4)/(1 xx 2)`
= 10
Hence, the total number of ways of selecting 3 books to be borrowed
= 5 + 10
= 15
APPEARS IN
संबंधित प्रश्न
Find the value of 15C4
Find the value of `""^15"C"_4 + ""^15"C"_5`
Find the value of `""^20"C"_16 - ""^19"C"_16`
Find n if `""^"n""C"_("n" - 3)` = 84
Find r if `""^14"C"_(2"r"): ""^10"C"_(2"r" - 4)` = 143:10
If `""^"n""P"_"r" = 1814400` and `""^"n""C"_"r"` = 45, find r.
If `""^"n""C"_("r" - 1)` = 6435, `""^"n""C"_"r"` = 5005, `""^"n""C"_("r" + 1)` = 3003, find `""^"r""C"_5`.
Find the number of diagonals of an n-shaded polygon. In particular, find the number of diagonals when: n = 10
Find the number of triangles formed by joining 12 points if four points are collinear.
Find n, if `""^"n""C"_("n" - 2)` = 15
Find x if `""^"n""P"_"r" = "x" ""^"n""C"_"r"`
Find r if `""^11"C"_4 + ""^11"C"_5 + ""^12"C"_6 + ""^13"C"_7 = ""^14"C"_"r"`
Find the differences between the largest values in the following: `""^14"C"_r "and" ""^12"C"_r`
Find the differences between the largest values in the following: `""^13"C"_r "and" ""^8"C"_r`
A committee of 10 persons is to be formed from a group of 10 women and 8 men. How many possible committees will have at least 5 women? How many possible committees will have men in the majority?
Find n if 2nC3 : nC2 = 52 : 3
Find n if nCn–3 = 84
Find n and r if nCr–1 : nCr : nCr+1 = 20 : 35 : 42
Find the number of ways of selecting a team of 3 boys and 2 girls from 6 boys and 4 girls
There are 20 straight lines in a plane so that no two lines are parallel and no three lines are concurrent. Determine the number of points of intersection
Find the number of triangles formed by joining 12 points if four points are collinear
A word has 8 consonants and 3 vowels. How many distinct words can be formed if 4 consonants and 2 vowels are chosen?
Find n if 2nCr–1 = 2nCr+1
Find n if nCn–2 = 15
Find r if 11C4 + 11C5 + 12C6 + 13C7 = 14Cr
Find the value of `sum_("r" = 1)^4 ""^((21 - "r"))"C"_4`
A group consists of 9 men and 6 women. A team of 6 is to be selected. How many of possible selections will have at least 3 women?
A committee of 10 persons is to be formed from a group of 10 women and 8 men. How many possible committees will have at least 5 women? How many possible committees will have men in majority?
A question paper has two sections. section I has 5 questions and section II has 6 questions. A student must answer at least two question from each section among 6 questions he answers. How many different choices does the student have in choosing questions?
There are 3 wicketkeepers and 5 bowlers among 22 cricket players. A team of 11 players is to be selected so that there is exactly one wicketkeeper and at least 4 bowlers in the team. How many different teams can be formed?
Answer the following:
Ten students are to be selected for a project from a class of 30 students. There are 4 students who want to be together either in the project or not in the project. Find the number of possible selections
Answer the following:
30 objects are to be divided in three groups containing 7, 10, 13 objects. Find the number of distinct ways for doing so.
Answer the following:
Find the number of ways of dividing 20 objects in three groups of sizes 8, 7 and 5
Answer the following:
There are 4 doctors and 8 lawyers in a panel. Find the number of ways for selecting a team of 6 if at least one doctor must be in the team
If vertices of a parallelogram are respectively (2, 2), (3, 2), (4, 4), and (3, 4), then the angle between diagonals is ______
