A variable plane which is at a constant ...

A variable plane which is at a constant distance `3p` from the origin O cuts the axes at L,M and N.Show that the locus of the points of intersection of the planes through L,M,N drwon parallel to the coordinate planes is `9(x^(-2)+y^(-2)+z^(-2))=p^(-2)`.

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CHHAYA PUBLICATION-PLANE -EXERCISE 5A (Short answer Type question)

Find the coordinates of the foot of the perpendicular and the prependi...
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Find the equations of the three planes which are parallel to the coord...
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Let (2,3,-1) be the coodinates of the foot of the prependicular drown ...
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Show that the equation of the plane passing through the point (1,2,3) ...
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Find the equation of the plane passing through the points (1,1,2) and ...
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Prove that the equation of the plane which is pendicular to the plane ...
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Prove that the equation of the plane which passes through the point (-...
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Show that the planes ax+by+r=0,by +cz+p=0 and cz+ax+q=0 are prependicu...
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If the points (2-x,2,2),(2,2-y,2) and (2,2,2-z) are coplanar then prov...
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Let vecn be a vector of magnitude 2sqrt3 such that it makes equal actu...
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Through the point P( alpha, beta ,lambda) a plane is drown prependicul...
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A variable plane which is at a constant distance 3p from the origin O ...
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A variable plane passes through the point (f, g, h ) and meets the axe...
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A point P moves on the plane (x)/(a)+(y)/(b)+(z)/(c)=1. The plane, dra...
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