Math, asked by Ayushvidulkar, 3 months ago

Find vector equation of a plane which is at a distance of 42 units from origin and which is normal to the vector 2i+j-2k​

Answers

Answered by CyberSquad
0

Answer:

If  

n

^

 is a  unit vector along the normal and p i the length of the perpendicular from origin to  the plane, then the vector equation of the plane  

r

^

.  

n

^

=p  

Hence,  

n

ˉ

=2  

i

^

+  

j

^

​  

−2  

k

^

 and p=42

∴∣  

n

ˉ

∣=  

2  

2

+1  

2

+(−2)  

2

 

​  

 

=  

9

​  

 

=3  

n

^

=  

∣N∣

n

ˉ

 

​  

 

=  

3

1

​  

(2  

i

^

+  

j

^

​  

−2  

k

^

)

∴ the vector equation of the required plane is  

r

ˉ

[  

3

1

​  

(2  

i

^

+  

j

^

​  

−2  

k

^

)]=42

i.e.,  

r

ˉ

(2  

i

^

+  

j

^

​  

=2  

k

^

)=126

Step-by-step explanation:

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