QUESTION IMAGE
Question
select the equation that shows that the gravitational potential energy of a 700 - kg boulder raised 8 m above ground level in units of n/kg, because m/s² is equivalent to n/kg.)
○ pe = \frac{mgh}{2}=\frac{(700\text{ kg})(10\text{ n/kg})(8\text{ m})}{2}=56000\text{ j}
○ pe = \frac{mg}{h}=\frac{(700\text{ kg})(10\text{ n/kg})}{(8\text{ m})}=56000\text{ j}
○ pe = mgh=(700\text{ kg})(10\text{ n/kg})(8\text{ m})=56000\text{ j}
○ pe = \sqrt{mgh}=\sqrt{(700\text{ kg})(10\text{ n/kg})(8\text{ m})}=56000\text{ j}
Step1: Recall gravitational - potential - energy formula
The formula for gravitational potential energy is $PE = mgh$, where $m$ is the mass, $g$ is the acceleration due to gravity, and $h$ is the height.
Step2: Substitute given values
Given $m = 700$ kg, $g=10$ N/kg, and $h = 8$ m. Substituting into $PE=mgh$, we get $PE=(700\text{ kg})(10\text{ N/kg})(8\text{ m})$.
Step3: Calculate the result
$(700)(10)(8)=56000$ J.
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PE = mgh = (700 kg)(10 N/kg)(8 m) = 56000 J