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How to use it?
How do you in partial fractions?:
x^3/(x^4-1)
sqrt(1-((1-x*x)*(n0*n0)/(n1*n1)))
(x^2-2*x+1)/(x-1)
-tan(-1/2+x)/(-1+tan(-1/2+x)^2)
Factor polynomial:
z^3+3*z^2+4*z+12-0
z^2+d/z-2
z^2-6*z+5
z^2+6*z+1
Least common denominator:
(x/y)-(y/x)-y/x+y-1
((x*y)+sin(x))/(|1-y|*(log(x)/log(10)))
(x*y+10*y^2/2-5*(y-1)^2-(x-10)*(y-1))/((x-10)*(y-1)+10*(y-1)^2/2-5*(y-2)^2-(x-20)*(y-2))
x/x+6*y/5-x*y-2*x^2/x^2-7*y^2/5
Factor squared:
y^4+6*y^2+7
y^4-6*y^2-6
y^4+7*y^2-8
y^4-6*y^2+5
Identical expressions
sqrt(one -((one -x*x)*(n0*n0)/(n1*n1)))
square root of (1 minus ((1 minus x multiply by x) multiply by (n0 multiply by n0) divide by (n1 multiply by n1)))
square root of (one minus ((one minus x multiply by x) multiply by (n0 multiply by n0) divide by (n1 multiply by n1)))
√(1-((1-x*x)*(n0*n0)/(n1*n1)))
sqrt(1-((1-xx)(n0n0)/(n1n1)))
sqrt1-1-xxn0n0/n1n1
sqrt(1-((1-x*x)*(n0*n0) divide by (n1*n1)))
Similar expressions
sqrt(1-((1+x*x)*(n0*n0)/(n1*n1)))
sqrt(1+((1-x*x)*(n0*n0)/(n1*n1)))
sqrt(1-(1-x*x)*n^0*n^0/(n^1*n^1))

Expression simplification/ Fraction Decomposition into the simple/ sqrt(1-((1-x*x)*(n0*n0)/(n1*n1)))

How do you sqrt(1-((1-xx)(n0n0)/(n1n1))) in partial fractions?

The solution

You have entered [src]

    _____________________
   /     (1 - x*x)*n0*n0 
  /  1 - --------------- 
\/            n1*n1

$$\sqrt{- \frac{n_{0} n_{0} \left(- x x + 1\right)}{n_{1} n_{1}} + 1}$$

sqrt(1 - (1 - x*x)*(n0*n0)/(n1*n1))

Fraction decomposition [src]

sqrt(1 - n0^2/n1^2 + n0^2*x^2/n1^2)

$$\sqrt{\frac{n_{0}^{2} x^{2}}{n_{1}^{2}} - \frac{n_{0}^{2}}{n_{1}^{2}} + 1}$$

      __________________
     /       2     2  2 
    /      n0    n0 *x  
   /   1 - --- + ------ 
  /          2      2   
\/         n1     n1

General simplification [src]

      ____________________
     /   2     2 /     2\ 
    /  n1  - n0 *\1 - x / 
   /   ------------------ 
  /             2         
\/            n1

$$\sqrt{\frac{- n_{0}^{2} \left(1 - x^{2}\right) + n_{1}^{2}}{n_{1}^{2}}}$$

sqrt((n1^2 - n0^2*(1 - x^2))/n1^2)

Expand expression [src]

      ___________________
     /       2           
    /      n0 *(1 - x*x) 
   /   1 - ------------- 
  /               2      
\/              n1

$$\sqrt{- \frac{n_{0}^{2} \left(- x x + 1\right)}{n_{1}^{2}} + 1}$$

sqrt(1 - n0^2*(1 - x*x)/n1^2)

Rational denominator [src]

      ____________________
     /   2     2     2  2 
    /  n1  - n0  + n0 *x  
   /   ------------------ 
  /             2         
\/            n1

$$\sqrt{\frac{n_{0}^{2} x^{2} - n_{0}^{2} + n_{1}^{2}}{n_{1}^{2}}}$$

sqrt((n1^2 - n0^2 + n0^2*x^2)/n1^2)

Assemble expression [src]

      __________________
     /       2 /     2\ 
    /      n0 *\1 - x / 
   /   1 - ------------ 
  /              2      
\/             n1

$$\sqrt{- \frac{n_{0}^{2} \left(1 - x^{2}\right)}{n_{1}^{2}} + 1}$$

sqrt(1 - n0^2*(1 - x^2)/n1^2)

Powers [src]

      ___________________
     /       2 /      2\ 
    /      n0 *\-1 + x / 
   /   1 + ------------- 
  /               2      
\/              n1

$$\sqrt{\frac{n_{0}^{2} \left(x^{2} - 1\right)}{n_{1}^{2}} + 1}$$

      __________________
     /       2 /     2\ 
    /      n0 *\1 - x / 
   /   1 - ------------ 
  /              2      
\/             n1

$$\sqrt{- \frac{n_{0}^{2} \left(1 - x^{2}\right)}{n_{1}^{2}} + 1}$$

sqrt(1 - n0^2*(1 - x^2)/n1^2)

Common denominator [src]

      __________________
     /       2     2  2 
    /      n0    n0 *x  
   /   1 - --- + ------ 
  /          2      2   
\/         n1     n1

$$\sqrt{\frac{n_{0}^{2} x^{2}}{n_{1}^{2}} - \frac{n_{0}^{2}}{n_{1}^{2}} + 1}$$

sqrt(1 - n0^2/n1^2 + n0^2*x^2/n1^2)

Combining rational expressions [src]

      ____________________
     /   2     2 /     2\ 
    /  n1  - n0 *\1 - x / 
   /   ------------------ 
  /             2         
\/            n1

$$\sqrt{\frac{- n_{0}^{2} \left(1 - x^{2}\right) + n_{1}^{2}}{n_{1}^{2}}}$$

sqrt((n1^2 - n0^2*(1 - x^2))/n1^2)

Numerical answer [src]

(1.0 - n0^2*(1.0 - x^2)/n1^2)^0.5

(1.0 - n0^2*(1.0 - x^2)/n1^2)^0.5

Trigonometric part [src]

      __________________
     /       2 /     2\ 
    /      n0 *\1 - x / 
   /   1 - ------------ 
  /              2      
\/             n1

$$\sqrt{- \frac{n_{0}^{2} \left(1 - x^{2}\right)}{n_{1}^{2}} + 1}$$

sqrt(1 - n0^2*(1 - x^2)/n1^2)

Combinatorics [src]

      __________________
     /       2     2  2 
    /      n0    n0 *x  
   /   1 - --- + ------ 
  /          2      2   
\/         n1     n1

$$\sqrt{\frac{n_{0}^{2} x^{2}}{n_{1}^{2}} - \frac{n_{0}^{2}}{n_{1}^{2}} + 1}$$

sqrt(1 - n0^2/n1^2 + n0^2*x^2/n1^2)

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How to use it?

Identical expressions

Similar expressions

How do you sqrt(1-((1-x*x)*(n0*n0)/(n1*n1))) in partial fractions?

The solution

How do you sqrt(1-((1-xx)(n0n0)/(n1n1))) in partial fractions?