Consider the equation 2^(|x+1|) - 2^x =|...

Consider the equation `2^(|x+1|) - 2^x =|2^x -1|+ 1` The least value of x satisfying the equation is (A) 0 (B) 2 (C)4 (D) None of these 19 Number of integers less than 15 satisfying the equation are (A) 14 (B) 15 (C) 16 (D) None of these 19 Number of composite numbers less than 20 wh are rime with 4 satisfying the given equation is/are (A)2 (B) 3 (C) 4 (D) 5 Space For Rough Work s 4 3-1

Similar Questions

Explore conceptually related problems

Number of integrs less than 15 satisfying the equation 2^(|x+1|)-2^x=|2^x-1|+1 are (A) 14 (B) 15 (C) 16 (D) none of these

Number of integrs less than 15 satisfying the equation 2^(|x+1|)-2^(x)=|2^(x)-1|+1 are (A) 14(B)15(C)16(D) none of these

Number of composite numbers less than 20 which are coprime with 4 satisfying the given equation 2^(|x+1|)-2^x=|2^x-1|+1 is/ A.2 B.3 C.4 D.5

Consider the equation: 2^(|x+1|)-2^x=|2^x-1|+1 Number of integers less than 15 satisfying the equation are

Consider the equation: 2^(|x+1|)-2^x=|2^x-1|+1 The least value of x satisfying is a. 0 b. 2 c. 4 d. None of these

Number of composite numbers less than 20 which are coprime with 4 satisfying the given equation 2^(|x+1|)-2^(x)=|2^(x)-1|+1 is/ A.2 B.3 C.4 D.

Consider the equation: 2^(|x+1|)-2^x=|2^x-1|+1 Number of composite numbers less than 20 which are coprime with 4 satisfying the given equation is/are

Consider the equation: 2^(|x+1|)-2^(x)=|2^(x)-1|+1 Number of composite numbers less than 20 which are coprime with 4 satisfying the given equation is/are a.2b.3 c.4d.5

Consider the equation: 2^(x+1)-2^(x)=|2^(x)-1|+1 The least value of x satisfying is a.0 b.2 c.4 d.None of these

The least value of x satisfying the equation 2^(|x+1|)-2^x=|2^x-1|+1 is 0 (b) 2 (c) 4 (d) none of these

Similar Questions

Recommended Questions