" If "x" is real,then prove that "(x)/(x...

" If "x" is real,then prove that "(x)/(x^(2)-5x+9)" lies between "-(1)/(11)" and "1.

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If x is real, prove that (x)/(x^(2)-5x+9) lies between 1 and (-1)/(11) .

(x)/(x^(2)-5x+9)<=1

if x is real,show that (x)/(x^(2)-5x+9) always lies in the interval [-(1)/(11),1]

If x is real,then x/(x^(2)-5x+9) lies between -1 and -1/11 b.1 and -1/11 c. 1and1/11d.none of these

If x is real number, then x/(x^(2)-5x+9) must lie between

If x be real then prove that (x-1)(x-2)+1 is always positive.

If x is real, then x//(x^2-5x+9) lies between -1a n d-1//11 b. 1a n d-1//11 c. 1a n d1//11 d. none of these

If x is real, then x//(x^2-5x+9) lies between -1a n d-1//11 b. 1a n d-1//11 c. 1a n d1//11 d. none of these

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