Solve the problem.
-The number of centimeters, $\mathrm { d }$, that a spring is compressed from its natural, uncompressed position is given by the formula $\mathrm { d } = \sqrt { \frac { 2 \mathrm {~W} } { \mathrm { k } } }$, where $\mathrm { W }$ is the number of joules of work done to move the spring and $\mathrm { k }$ is the spring constant. Solve this equation for W. Use the result to determine the work needed to move a spring 3 centimeters if it has a spring constant of $0.2$.
A) $\mathrm { W } = \frac { \mathrm { d } ^ { 2 } \mathrm { k } } { 2 } ; 0.9$ joules
B) $\mathrm { W } = \frac { \mathrm { d } ^ { 2 } \mathrm { k } ^ { 2 } } { 4 } ; 0.1$ joules
C) $W = \frac { 2 d ^ { 2 } } { k } ; 90$ joules
D) $\mathrm { W } = 2 \mathrm {~d} ^ { 2 } \mathrm { k } ; 3.6$ joules

Question

Quizplus · Accepted Answer

Squaring both sides of the given equation $\mathrm { d } = \sqrt { \frac { 2 \mathrm {~W} } { \mathrm { k } } }$ gives $d^2 = \frac{2W}{k}$, which can be rearranged to solve for $W$ as $W = \frac{d^2k}{2}$. Substituting $d = 3$ cm and $k = 0.2$ into this formula yields $W = \frac{3^2 \times 0.2}{2} = 0.9$ joules.

Solve the Problem d\mathrm { d }d , That a Spring Is Compressed from Its Natural, Uncompressed

Solve the Problem $\mathrm { d }$ , That a Spring Is Compressed from Its Natural, Uncompressed