Question #43265

A person walks 23 m East and then walks
33 m at an angle 22◦ North of East.
What is the magnitude of the total dis-
placement?

Expert's answer

Answer on Question #43265 – Physics – Mechanics | Kinematics | Dynamics

A person walks 23m23\,\mathrm{m} East and then walks 33m33\,\mathrm{m} at an angle 2222{}^{\circ} North of East. What is the magnitude of the total displacement?

Solution:

We have two displacements: r1r_1 (when person walks 23 m East), r2r_2 (when person walks 33 m at an angle 2222{}^{\circ}) and total displacement rr.

Displacement along the X-axis:


r1x=23mr2x=33mcos(22)=30.6mrx=r1x+r2x=23m+30.6m=53.6m\begin{array}{l} r_{1x} = 23\,\mathrm{m} \\ r_{2x} = 33\,\mathrm{m} \cdot \cos(22{}^{\circ}) = 30.6\,\mathrm{m} \\ r_x = r_{1x} + r_{2x} = 23\,\mathrm{m} + 30.6\,\mathrm{m} = 53.6\,\mathrm{m} \\ \end{array}


Displacement along the Y-axis:


r1y=0r2y=33msin(22)=12.36mry=r1y+r2y=0+12.36m=12.36m\begin{array}{l} r_{1y} = 0 \\ r_{2y} = 33\,\mathrm{m} \cdot \sin(22{}^{\circ}) = 12.36\,\mathrm{m} \\ r_y = r_{1y} + r_{2y} = 0 + 12.36\,\mathrm{m} = 12.36\,\mathrm{m} \\ \end{array}


Using the Pythagorean Theorem:


r2=ry2+rx2r^2 = r_y^2 + r_x^2D=ry2+rx2=(53.6m)2+(12.36m)2=55mD = \sqrt{r_y^2 + r_x^2} = \sqrt{(53.6\,\mathrm{m})^2 + (12.36\,\mathrm{m})^2} = 55\,\mathrm{m}


Answer: the magnitude of total displacement is equal to 55m55\,\mathrm{m}.

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