Vector equation of the plane `r = hati-hatj+ lamda(hati +hatj+hatk)+mu(hati – 2hatj+3hatk)` in the scalar dot product form is

Find the vector equation of the plane vecr=hati-hatj+lambda(hati+hatj+hatk)+mu(hati-2hatj+3hatk) in scalar product form. Reduce it to normal form.

Convert the equation of the plane vecr = (hati-hatj)+lambda(-hati+hatj+2hatk)+mu(hati+2hatj+hatk) into scalar product form.

Convert the equation of the plane vecr = (hati-hatj)+lambda(-hati+hatj+2hatk)+mu(hati+2hatj+hatk) into scalar product form.

The vector equation of the plane bar r=(3hati+hatj)+lambda(-hatj+hatk)+mu(hati+2hatj+3hatk) in scalar product form is

Find the vector equation of the plane vecr = 2 hati + hatj - 3 hatk + lamda ( 2hatj +hatk) + mu(5 hati + 2 hatj + hatk) in scalar product form.

The vector equation of the plane r=(2hati+hatk)+lamda(hati)+mu(hati+2hatj-3hatk) in scalar product formm is r*(3hati+2hatk)=alpha , then alpha = . . .

The vector equation of the plane barr=(2hati+hatk)+lamdahati+mu(hati+2hatj-3hatk) is

Find the vector equation of the following planes in cartesian form : " "vecr=hati-hatj+lamda(hati+hatj+hatk)+mu(hati-2hatj+3hatk) .