Vector Operations - Page 6
Questions
- What is the cross product of #<4 , 5 ,-9 ># and #<5 ,-3 ,-3 >#?
- What is the unit vector that is orthogonal to the plane containing # (-i + j + k) # and # (i -2j + 3k) #?
- How do you use the definition of the scalar product, find the angles between the following pairs of vectors: A = -i - 2k and B = - 5i + 5j + 5k?
- What is the dot product of #<9,1,-1 ># and #<6,-8,2 >#?
- What is # || < -3, 9 , 5 > || #?
- What is the projection of #<4,-6,3 ># onto #<1,5,2 >#?
- How do you normalize <0,2,0>?
- What is the dot product of #<2,0,7># and #<-4,9,-1 >#?
- How do you normalize <2,0,-1>?
- What is the cross product of #[1, 4, -2]# and #[2, -1, 1] #?
- What is the norm or #< 4 , 3 , -2 >#?
- What is the dot product of #<-8,5,2 > # and #<-3,1,7 > #?
- How do you find a=1/3(2b-5c) given b=<6,3> and c=<-4,8>?
- How do force vectors affect an object in motion?
- What is the norm of #< -3, -4 , -2 >#?
- What is the cross product of #[-1, -1, 2]# and #[3, 2, 5] #?
- What is the unit vector that is normal to the plane containing <2i+7j-2k> and <8i-2j+3k>?
- What is the cross product of #[2,4,5]# and #[-1,0,1] #?
- What is # || < -6 , 3, -3 > || #?
- What is the unit vector that is orthogonal to the plane containing # ( - 4 i - 5 j + 2 k) # and # ( i + 7 j + 4 k) #?