1-p+(2/p)/(6/p^2)+(1/p)-1

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Solution for 1-p+(2/p)/(6/p^2)+(1/p)-1 equation: 


D( p )

p = 0

6/(p^2) = 0

p^2 = 0

p = 0

p = 0

6/(p^2) = 0

6/(p^2) = 0

6*p^-2 = 0 // : 6

p^-2 = 0

p naleu017Cy do O

p^2 = 0

p^2 = 0

1*p^2 = 0 // : 1

p^2 = 0

p = 0

p in (-oo:0) U (0:+oo)

(2/p)/(6/(p^2))-p+1/p-1+1 = 0

1*p^-1-2/3*p^1 = 0

(1*p^0-2/3*p^2)/(p^1) = 0 // * p^2

p^1*(1*p^0-2/3*p^2) = 0

p^1

(-2/3)*p^2+1 = 0

(-2/3)*p^2+1 = 0

DELTA = 0^2-(1*4*(-2/3))

DELTA = 8/3

DELTA > 0

p = ((8/3)^(1/2)+0)/(2*(-2/3)) or p = (0-(8/3)^(1/2))/(2*(-2/3))

p = -3/4*(8/3)^(1/2) or p = 3/4*(8/3)^(1/2)

p in { -3/4*(8/3)^(1/2), 3/4*(8/3)^(1/2)} 

p in { -3/4*(8/3)^(1/2), 3/4*(8/3)^(1/2) }

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