Chapter 1 - Problems - Page 32: 1.42

Conversions: 1 in. $=25.4 \mathrm{~mm}$ Calculate the number of lead balls that together weighs $1 \mathrm{lb}$. $n \frac{1}{12} \mathrm{lb}=1 \mathrm{lb}$ Here, $\frac{1}{12} \mathrm{lb}$ is the weight of single lead ball. $n=12$ Therefore, the number of lead balls that fit in the barrel is 12 . Calculate the diameter of the lead ball. $$ n \times \frac{\pi}{6} d^{3} \rho=1 \mathrm{lb} $$ Here, $\frac{\pi}{6} d^{3}$ is the volume of the lead ball and $\rho$ is the density of the lead ball. Substitute 12 for $n$ and $0.411 \mathrm{lb} / \mathrm{in}^{3}$ for $\rho$ $$ \begin{array}{l} 12 \times \frac{\pi}{6} d^{3} \times 0.411=1 \mathrm{lb} \\ d^{3}=0.38743 \\ d=0.729 \mathrm{in} . \end{array} $$ $=0.729 \times 25.4 \mathrm{~mm}$ $$ =18.51 \mathrm{~mm} $$ Therefore, the diameter of the lead ball is $18.51 \mathrm{~mm}$. Find the diameter of the lead ball in inches by using conversion formula. $$ \begin{aligned} d &=18.51 \mathrm{~mm} \times \frac{1 \mathrm{in}}{25.4 \mathrm{~mm}} \\ &=0.729 \mathrm{in} \end{aligned} $$ Therefore, the diameter of the lead ball is $0.729 \mathrm{in}$.

Conversions: 1 in. $=25.4 \mathrm{~mm}$ Calculate the number of lead balls that together weighs $1 \mathrm{lb}$. $n \frac{1}{12} \mathrm{lb}=1 \mathrm{lb}$ Here, $\frac{1}{12} \mathrm{lb}$ is the weight of single lead ball. $n=12$ Therefore, the number of lead balls that fit in the barrel is 12 . Calculate the diameter of the lead ball. $$ n \times \frac{\pi}{6} d^{3} \rho=1 \mathrm{lb} $$ Here, $\frac{\pi}{6} d^{3}$ is the volume of the lead ball and $\rho$ is the density of the lead ball. Substitute 12 for $n$ and $0.411 \mathrm{lb} / \mathrm{in}^{3}$ for $\rho$ $$ \begin{array}{l} 12 \times \frac{\pi}{6} d^{3} \times 0.411=1 \mathrm{lb} \\ d^{3}=0.38743 \\ d=0.729 \mathrm{in} . \end{array} $$ $=0.729 \times 25.4 \mathrm{~mm}$ $$ =18.51 \mathrm{~mm} $$ Therefore, the diameter of the lead ball is $18.51 \mathrm{~mm}$. Find the diameter of the lead ball in inches by using conversion formula. $$ \begin{aligned} d &=18.51 \mathrm{~mm} \times \frac{1 \mathrm{in}}{25.4 \mathrm{~mm}} \\ &=0.729 \mathrm{in} \end{aligned} $$ Therefore, the diameter of the lead ball is $0.729 \mathrm{in}$.