Real Numbers Class 10 CBSE EX 1.1 Q3

Application Of Trigonometry Class 10 | CBSE Class 10 Height And Distance

Class 10 Exercise 10.2 Question 1 | CBSE Class 10 Ex -10.2 Q1 | NCERT | Class 10 Maths Chapter 10

Sets , Nios, Class-12, Ch-1 ,Ex-1.1 ,Q-1

If a ,b ,c are real numbers such that 0 < a < 1,0 < b < 1,0 < c < 1,a+b+c=2, then prove that a/(1-a)b/(1-b)c/(1-c)geq8

(i) Let A={1,2,3,4} and B={1,2,3,4,5} . Since every member of A is also a member of B, A subset B (ii) The set Q of rational numbers is a subset of set R of real number and we write as Q subset R

For positive real numbers a (a>1) let p_a and q_a , be the maximum and minimum values of log_a(x) , for alt=xlt=2a and if p_a-q_a=1/2 then the value of a is not greater than

If 2x^3 +ax^2+ bx+ 4=0 (a and b are positive real numbers) has 3 real roots, then prove that a+ b ge 6 (2^(1/3)+ 4^(1/3))

x in {real numbers} and -1 lt 3 - 2x le 7 , evaluate x and represent it on a number line.

Arithmetic progression | class 10 | Exercise 5.1 |