If [x] and (x) are the integral part of ...

If `[x]` and `(x)` are the integral part of x and nearest integer to `x` then solve `(x)[x]=1`

Text Solution

Verified by Experts

CaseI If `x epsilonI`, then `x=[x]=(x)`
`:.` Given equation convert in `x^(2)=1`
`:.x=(+-1)`
Case II If `x!inI` then `(x)=[x]+1`
`:.` Given equation convert in
`([x]+1)[x]=1implies[x]^(2)+[x]-1=0`
or `[x]=(-1+-sqrt(5))/2` [impossible]
Then final answer is `x=+-1`.

Similar Questions

Explore conceptually related problems

If [x] is the integral part of a real number x . Then solve [2x]-[x+1]=2x

If {x} and [x] represent fractiona and integral part of x respectively then solve the equation x-1=(x-[x])(x-{x})

If {x} and [x] represent fractional and integral part of x respectively, find the value of [x]+sum_(r=1)^(2000)({x+r})/2000

f (x)= {x} and g(x)= [x]. Where { } is a fractional part and [ ] is a greatest integer function. Prove that f(x)+ g(x) is a continuous function at x= 1.

Let {x} and [x] denotes the fraction fractional and integral part of a real number (x) , respectively. Solve |2x-1|=3[x]+2{x} .

Method of integration by parts : The anti derivative of f(x) and e^(x) and the anti derivative of g(x) is cosx , then, intf(x)cosxdx+intg(x)e^(x)dx=............

Show that the function defined by g(x)= x - [x] is discontinuous at all integral points. Here [x] denotes the greatest integer less than or equal to x.

Method of integration by parts : int tan^(-1)x dx=....

Method of integration by parts : inte^(x)sin x cos x dx=...+c

Integrate the functions 1/(x-x^(3))

If `[x]` and `(x)` are the integral part of x and nearest integer to `x` then solve `(x)[x]=1`

Text Solution

Similar Questions

Recommended Questions