Home
Class 11
MATHS
Expand of the expression : (2/5-x/2)^5...

Expand of the expression : `(2/5-x/2)^5`

Text Solution

Verified by Experts

`(2/5-x/2)^5`
=`""^5C_0``(-x/2)^5`+ `""^5C_1``(-x/2)^4``(2/x)` + `""^5C_2``(-x/2)^3``(2/x)^2` + `""^5C_3``(-x/2)^2``(2/x)^3` + `""^5C_4``(-x/2)^1``(2/x)^4` + `""^5C_5``(-x/2)^0``(2/x)^5`
=-`""^5C_0``(x^5)/32`+ `""^5C_1``(x^3)/8` - `""^5C_2``(x/2)` + `""^5C_3``(2/x)` - `""^5C_4``(8/(x^4))` + `""^5C_5``32/(x^5)`
Promotional Banner

Topper's Solved these Questions

  • BINOMIAL THEOREM

    NCERT|Exercise SOLVED EXAMPLES|17 Videos

  • BINOMIAL THEOREM

    NCERT|Exercise EXERCISE 8.2|6 Videos

  • COMPLEX NUMBERS AND QUADRATIC EQUATIONS

    NCERT|Exercise EXERCISE 5.4|6 Videos

Similar Questions

Explore conceptually related problems

Expand of the expression: (1-2x)^(5)

Expand of the expression: (2x-3)^(6)

Expand of the expression: (x+(1)/(x))^(6)

Expand of the expression: ((x)/(3)+(1)/(x))^(5)

If x is real,then the least value of the expression (x^(2)-6x+5)/(x^(2)+2x+1) is

If x in R , the least value of the expression (x^(2)-6x+5)/(x^(2)+2x+1) is

" The range of the expression "y=(x^(2)-6x-5)/(x-2)" Where "x in R-{2}" is "