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Yadunandan Pandit
Asked: 2022-11-04T18:46:11+05:30 In:

If `m`, `n` are positive integers and `m+nsqrt(2)=sqrt(41+24sqrt(2))`, then `(m+n)` is equal to
A. `5`
B. `6`
C. `7`
D. `8`

If `m`, `n` are positive integers and `m+nsqrt(2)=sqrt(41+24sqrt(2))`, then `(m+n)` is equal to
A. `5`
B. `6`
C. `7`
D. `8`
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  1. Correct Answer – C
    `(c )` We have `m+nsqrt(2)=sqrt(41+24sqrt(2))`
    Squaring both sides, we get
    `m^(2)+2n^(2)+2sqrt(2)mn=4a+24sqrt(2)`
    `:.` On comparing we get
    `m^(2)+2n^(2)=41`…….`(i)`
    and `mn=12`…….`(ii)`
    `:.` On solving `(i)` and `(ii)`, we get
    `implies m^(2)+(2(144))/(m^(2))=41`
    `impliesm^(4)=41m^(2)+288=0`
    `implies (m^(2)-32)(m^(2)-9)=0`
    `implies m^(2) ne 32`
    `:. m^(2) =9 implies m =3` and `n=4`
    Hence, `(m+n)=7`

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