Dear students as presentation of introduction of this chapter was already shared now solve the exercise and assignment in your note book
and if you have any doubt then you can post your doubt in comment box .
Click on this link to see the solutions of exercise 15.1 and 15.2
https://www.youtube.com/watch?v=I6OMrX2U1eQ&list=PLZihDlFUnEcx9IcceSBTfx1rF0lvcWKoC
ASSIGNMENT OF CH- 15
PROBABILITY
1. A die is
thrown once. Find ( a) P( a number ≥ 3)
(b) P ( a number < 7)
(c) P(odd
number) (d) P(prime number) (e) P( between 2 and 6)
2. In a single
throw of two dice what is the probability of getting
(a) both odd
numbers (b) a total of 9 or 11 (c) same no. on both the dice( doublet)
(d) the sum
of nos. as whole no. (e) the sum of
nos. as prime nos.
(f) prime as
a whole (g) sum of nos. less than 9 (h) sum more than 9
(i) number
as a whole divisible by 2 and 3 (j)
number as a whole divisible by 2 or 3
3. One card is
drawn from a well shuffled deck of 52 cards . Find the probability of
Drawing:- (a)
an ace (b) a jack (c) red face card
(d) black queen (e) red
card (f) 10 of
black suit
(g) 7 of club (h) a
diamond face card (i) non ace non
face card
(j) a heart (k) non face card (l) a king or a queen
(m) neither king nor a queen (n) a card of spades or
an ace
(o) a face card (p) neither a red face card nor queen
4. The king ,
queen and jack of clubs are removed from a pack of 52 playing cards. The
remaining cards are then well shuffled and one card is selected at random. Find
the probability of getting
(a) a heart (b)
a king (c) a club (d) the 10 of hearts
5. All the three
face cards of spades are removed from a well shuffled pack of 52 cards
A card is
drawn at random from the remaining pack . find the probability of getting
(a) a black
face cards (b) a queen (c) a black card
6. Two unbiased
coins are tossed. Find the probability of getting
(a) exactly
two head (b) exactly one
tail (c) at least
two tails
(d) at most
two tails (e) not less than one
head( or at least one head) (f) no
tail
7. Three coins
are tossed simultaneously. Find the probability of getting
(a) head and
tail alternately (b) at least two
head (c) at most one head
8. In a family,
there are three children. Assuming that chances of a child being a male or
a female are
equal. Find the probability that (a) there is one girl in a family (b) there is no female child
in the family (c) there is at least one male child in the family
9. What is the
probability of having 53 Tuesdays in a (a) non-leap year (b) leap year?
10. If the probability of winning the game is 5/11. What
is the probability of losing?
11. Sativa and Hamid are friends . What is the
probability that both will have
(a) different
birthday ? (b) the same
birthday?
12. A box contains cards bearing numbers from 6 to 70. If
one card is drawn at random
from the box,
Find the probability that it bears
(a) one digit numbers
(b) no.
divisible by 5
(c) no. divisible by 3 and 5
(d) no. divisible by 3 or 5
(e) no. which is perfect square
13. A box contains 20 balls bearing numbers
1,2,3,4,…….20, A ball is drawn at random
from the box.
What is the probability that the no. on the ball is
(a) an odd
no. (b) divisible by 2or 3 (c) prime no. (d) not divisible by 10?
14. A bag contains 5 white balls, 7 red balls, 4 black
balls and 2 blue balls. One ball is
Drawn at
random from the bag. What is the probability that the ball drawn is
(a) white or
blue (b) red or black (c) not white (d) neither white nor black
15. Two customers are visiting a particular shop in the
same week( Monday to Saturday)
Each is
equally likely to visit the shop on any one day as on another. What is the
probability
that both will visit the shop on (i) the same day (ii) different days
(iii)
consecutive days