Fundamental Of Algebraic Expression MCQ (With Solution) - 3 (Competition Level 1) - JEE MCQ

The solution set of |x² + x| = x² + x is given by

Find the value(s) of x which satisfy 

If x ∈ R, the solution set of the inequation 4^{–x + 0.5} – 7. 2^–x – 4 < 0 is equal to 

The solution set of the inequality 

Set of values of x which satisfies 

If 3^x+2 - 9-1/ x> 0 , then the interval of x can be

If log₂x + log_x2 = 10/3 and log₂y + log_y2 = 10/3 then the value of x + y (where x ≠ y)      

the  complete   solution  set of values  of x is  

How many roots of the following equation 3^|x| (2- | x |) = 0 has

If x satisfies |x² – 3x + 2| + |x – 1| = x – 3, then 

If a > 0, then 

|2x - 3| < |x + 5|,  then x belongs to : 

The solution set of the equation

If a = log₁₂18, b = log₂₄54, then the value of ab + 5(a – b) is

If |x - 1|< 5 and |x| >2 . Then x is equal to 

Greatest negative integral value of x satisfying |4x + 3| = |7x - 1| - 3x - 4|

The integral value of x ∈ (–π, π) satisfying the equation |x² -1+cosx| = |x² - 1| + |cos x| can be

The set of values of x satisfying the inequality (x – 1)⁷ (3 – x)⁵ (x – 2)⁴ > 0 is 

The set of values of x satisfying the inequality 

If P and Q are sum and product respectively of all real values of x satisfying the equation 

If log₂ x + log₂ y > 6 , then the least value of (x + y) is :

If log₂ |4 - 5x| > 2 . Then complete solution set is equal to

If log₇2 = m, then log₄₉28 is equal to 

Maximum value of log₅ (3x + 4y) , if x² + y² = 25 is

The value of x satisfying