Read and fill in the gaps ( c) In Kumud's garden there are x number of saplings of marigold. But in Shahida's garden, there are three times more saplings. There are ― saplings in Shahind's garden.
Topper's Solved these Questions
CONCEPT OF ALGEBRAIC VARIABLES
JNAN PUBLICATION|Exercise Exercise |1 Videos
Concept Of Directed Number And Number Line
JNAN PUBLICATION|Exercise Example |100 Videos
Similar Questions
Explore conceptually related problems
Read and fill in the gaps ( d) Funds were collected for repairing the roads of Durganagar. Habib paid RS. X but Muskan paid Rs. 10 more than twice the money. Muskan paid Rs. ―
Panchayat has sent flower saplings to the student’s of class VI of Jodunath Vidya Mandir, for their school garden. It was found that if the saplings can be put in rows of 20, 24 and 30, then the number of saplings in each row will be equal. Let’s find the minimum number of saplings that Panchayat sent to School.
A father with 8 children takes 3 at a time to the zoological gardens, as often as he can without taking the same 3 children together more than once . the number of times he will go to the garden is
The time taken to clean out a garden by Majid is 3 hours more than that by Mahim. Both of them together can complete the work in 2 hours.Hence find the required quadratic equation.
A man has three friends. The number of ways he can invite one friend everyday for dinner on six successive nights so that no friend is invited more than three times is a. 640 b. 320 c. 420 d. 510
To fill 12 vacancies, there are 25 candidates of which 5 are from scheduled caste. If three of the vacancies are reserved for scheduled caste candidates while the rest are open to all; the number of ways in which the selection can be made is a. ""^5C_3 xx ""^(22)C_9 b. ""^22C_9-""^5C_3 c. ""^22C_3+ ""^5C_3 d. none of these
The time taken to clean out a garden by Priyo is t_(1) hours more then that by Prosanta. Both of them together can complete the work in t_(2) hours.Find the required quadratic equation.
A, B and C are three square matrices of order 3 such that A= diag (x, y, z) , det (B)=4 and det (C)=2 , where x, y, z in I^(+) . If det (adj (adj (ABC))) =2^(16)xx3^(8)xx7^(4) , then the number of distinct possible matrices A is ________ .
If vec x , vec y are two non-zero and non-collinear vectors satisfying [(a-2)alpha^2+(b-3)alpha+c] vec x+[(a-2)beta^2+(b-3)beta+c] vec y+[(a-2)gamma^2+(b-3)gamma+c]( vec x xx vec y)=0, w h e r ealpha,beta,gamma are three distinct real numbers, then find the value of (a^2+b^2+c^2-4)dot
JNAN PUBLICATION-CONCEPT OF ALGEBRAIC VARIABLES -Exercise
