Find the anti-derivative. \( \int(2 t-1) \vec{\imath}+4 t^{3} \vec{\jmath}+3 \sqrt{t} \vec{k} d t= \) \( \left(t^{[?]}-[\quad]\right) \vec{\imath}+t^{[]]}+[\quad] t^{[] / 2} \vec{k}+\vec{C} \)

To find the anti-derivative of the given vector function, we need to integrate each component separately. Starting with the first component \(2t - 1\): \[ \int (2t - 1) dt = t^2 - t + C_1 \] Next, the second component \(4t^3\): \[ \int 4t^3 dt = t^4 + C_2 \] Lastly, for the third component \(3\sqrt{t}\) which is \(3t^{1/2}\): \[ \int 3\sqrt{t} dt = 3 \cdot \frac{2}{3} t^{3/2} = 2t^{3/2} + C_3 \] Putting it all together, the anti-derivative is: \[ (t^2 - t) \vec{\imath} + t^4 \vec{\jmath} + 2t^{3/2} \vec{k} + \vec{C} \] Thus, filling in your given format, we get: 1. \( 2 \) 2. \( 4 \) 3. \( 2 \) 4. \( 3/2 \) So the complete expression is: \[ \left(t^{2}-[t]\right) \vec{\imath}+t^{4}+\left[2\right] t^{3/2} \vec{k}+\vec{C} \]