Maria starts at the origin and walks along all of the vector $2 extbf{i} + 3 extbf{j}$, then walks along all of the vector $3 extbf{i} - 2 extbf{j}$ and finally along all of the vector $4 extbf{i} - 3 extbf{j}$ - HSC - SSCE Mathematics Extension 1 - Question 4 - 2020 - Paper 1

The second vector is ( \textbf{B} = 3\textbf{i} - 2\textbf{j} ). Now adding this to the current position: ( \textbf{R_2} = \textbf{R_1} + \textbf{B} = (2 + 3, 3 - 2) = (5, 1) ).

The third vector is ( \textbf{C} = 4\textbf{i} - 3\textbf{j} ). Now adding this to the current position: ( \textbf{R_3} = \textbf{R_2} + \textbf{C} = (5 + 4, 1 - 3) = (9, -2) ).

To find the distance from the origin to the final position ( \textbf{R_3} = (9, -2) ), we use the distance formula: $d = \sqrt{(x^2 + y^2)} = \sqrt{(9^2 + (-2)^2)} = \sqrt{(81 + 4)} = \sqrt{85}.$ Thus, the distance from the origin is ( \sqrt{85} ).