The perpendicular distance of the origin form the plane which makes intercepts 12, 3 and 4 on x, y, z axes respectively, is
A
13
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B
11
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C
17
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D
6√2√13
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Solution
The correct option is D6√2√13 Let equation of plane be lx + my + nz = p, where p is the perpendicular distance of the plane from origin and (l,m,n) are the direction cosines of the normal to the plane
Or x(pl)+y(pm)+z(pn)=1
According to question, pl=12,pm=3,pn=4
or p12=l,p3=m,p4=n
or p2144+p29+p216=l2+m2+n2=1 ⇒p2(1144+19+116)=1p2(1+16+9144)=1
Or p2=14426=7213 ∴p=6√2√13