[" The locus of vertices of the family p...

[" The locus of vertices of the family parabola "y=(a^(3)x^(2))/(3)+(a^(2)x)/(2)-2a" is: "],[[" (A) "xy=(3)/(4)," (B) "xy=(35)/(16)," (C) "xy=(64)/(105)],[" Final Step-A "," 49"]]

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The locus of the vertices of the family of parabolas y=(a^(3)x^(2))/(3)+(a^(2)x)/(2)-2a is:

The locus of the vertices of the family of parabolas y=(a^(3)x^(2))/(3)+(a^(2)x)/(2)-2a is

The locus of the vertices of the family of parabolas y = (a^(3)x^(2))/(3)+(a^(2)x)/(2)-2a is

The locus of the vertices of the family of parabolas 6y =2a^(3)x^(2) +3a^(2)x-12a is

Show that locus of vertices of the family of parabolas y=(a^(3)x^(2))/(3)+(a^(2)x)/(2)-2a is xy=(105)/(64)

The locus of the vertices of the family of parabolas y =[a^3x^2]/3 + [a^2x]/2 -2a is:

The locus of the vertices of the family of parabolas y =[a^3x^2]/3 + [a^2x]/2 -2a is:

The locus of the vertices of the family of parabolas y =[a^3x^2]/3 + [a^2x]/2 -2a is:

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