Question 15.SP.12: Collars A and B are pin-connected to bar ABD and can slide a...

MODELING and ANALYSIS: Model bar ABD as a rigid body. From Sample Prob. 15.5, you know  \omega=3.00  \mathrm{rad} / \mathrm{s} \circlearrowleft . The accelerations of A and B are related by

\mathbf{a}_B=\mathbf{a}_A  +  \mathbf{a}_{B / A}=\mathbf{a}_A  +  \boldsymbol{\alpha} \times \mathbf{r}_{B / A}  –  \omega^2 \mathbf{r}_{B / A}

Substituting in known values (Fig. 1) and assuming α = αk gives

\begin{aligned}&a_B \cos 60^{\circ} \mathbf{i}  +  a_B \sin 60^{\circ} \mathbf{j}=0 \mathbf{i}  +  \alpha \mathbf{k} \times\left[\left(0.3 \cos 30^{\circ}\right) \mathbf{i}  +  \left(0.3 \sin 30^{\circ}\right) \mathbf{j}\right] \\&\quad-3^2\left[\left(0.3 \cos 30^{\circ}\right) \mathbf{i}  +  \left(0.3 \sin 30^{\circ}\right) \mathbf{j}\right] \\ &\quad 0.500 a_B \mathbf{i}  +  0.866 a_B \mathbf{j}=(0-0.15 \alpha  –  2.338) \mathbf{i}  +  (0.260 \alpha  –  1.350) \mathbf{j}\end{aligned}

Equating components, you have

Solving these equations gives  a_B=-3.12  \mathrm{~m} / \mathrm{s}^2 \text { and } \alpha=-5.20  \mathrm{rad} / \mathrm{s}^2

\begin{aligned}&\boldsymbol{\alpha}=5.20  \mathrm{rad} / \mathrm{s}^2\circlearrowright \\&\mathbf{a}_B=3.12  \mathrm{~m} / \mathrm{s}^2 \text { ⦫ } 60^{\circ} \\&\end{aligned}

REFLECT and THINK: Even though A is traveling at a constant speed, bar AB still has an angular acceleration, and B has a linear acceleration. Just because one point on a body is moving at a constant speed doesn’t mean the rest of the points on the body also have a constant speed.