Given: \(|\vec{a}| = 2\) and \(-3 \le k \le 2\).

We need to find the range of \(|k\vec{a}|\).

Using the property of scalar multiplication of vectors, we have \(|k\vec{a}| = |k||\vec{a}|\).

Substituting the given value of \(|\vec{a}|\), we get \(|k\vec{a}| = |k|(2) = 2|k|\).

Since \(-3 \le k \le 2\), we need to find the range of \(|k|\).

The minimum value of \(|k|\) is 0 (when \(k = 0\)) and the maximum value of \(|k|\) is 3 (when \(k = -3\)).

Therefore, \(0 \le |k| \le 3\).

Multiplying by 2, we get \(0 \le 2|k| \le 6\).

Thus, \(0 \le |k\vec{a}| \le 6\).