Explanation:
(i) To find the value of p, we need to find the magnitude of vector a:
|a| = √(2p^2i - 6p^2j + 3p^2k)
= √(2p^2 + 36p^2 + 9p^2)
= √(47p^2)
Since a is a unit vector, the magnitude of a must be 1. So, we can set up an equation to solve for p:
1 = √(47p^2)
p^2 = 1 / 47
p = √(1 / 47)
(ii) To find the dot product of a and b, we can use the formula:
a.b = |a| * |b| * cos(θ)
where θ is the angle between vectors a and b.
Since we know that a is a unit vector, the magnitude of a is 1. We can find the magnitude of b using the formula:
|b| = √(i^2 + j^2 + (-2k)^2)
= √(1 + 1 + 4)
= √(6)
So,
a.b = 1 * √(6) * cos(θ)