Given that roots of x^3+3px^2+3qx+r=0 ar...

Given that roots of `x^3+3px^2+3qx+r=0` are in
G.P. show that `p^3 r=q^3`

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Given that roots of x^3+3px^2+3qx+r=0 are in (i)A.P., show that 2p^3-3qp+r=0

show that the condition that the roots of x^3 + px^2 + qx +r=0 may be in G.P is p^3 r=q^3

show that the condition that the roots of x^3 + px^2 + qx +r=0 may be in G.P is p^3 r=q^3

Given that roots of x^3+3px^2+3qx+r=0 (iii) H.P ,. Show that 2q^3=r(3pq-r)

If zeros of x^(3)-3px^(2)+qx-r are in A.P. then

Show that the roots of the equation x^3 +px^2 +qx +r=0 are in G.P p^3 r= q^3

show that the condition that the roots of x^3 + 3 px^2 + 3 qx +r=0 may be in h.P is 2q^3=r (3 pq -r)

show that the condition that the roots of x^3 + 3 px^2 + 3 qx +r=0 may be in h.P is 2q^3=r (3 pq -r)

Find the condition that the roots of x^3+px^2+qx+r=0 are in G.P.

show that the condition that the roots of x^3 + 3 px^2 + 3 qx +r=0 may be in A.P " is" 2p^3 -3pq +r=0

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