Answer:
[tex]Energy=-1.59x10^{12}J[/tex]
Explanation:
Hello,
In this case, the requested energy is computed via the following equation, whereas the mass defected is the main issue to be calculated:
[tex]Energy=m_{d}*c^2[/tex]
Whereas [tex]m_{d}[/tex] is the mass defected and [tex]c[/tex] the speed of light. In this manner, such mass is computed via:
[tex]m_d=m_{products}-m_{reagents}\\m_d=(mass_{He}+m_{electron})-4m_H[/tex]
Now, given the mass of the H-1, He, and the electron, one computes such mass as shown below per 4 moles of H as those the involved moles:
[tex]m_d=4.00260g/mol+2*0.00054858g/mol-4*1.00782g/mol\\m_d=-0.027583g/4mol[/tex]
Finally, we apply the firstly given formula for the determination of the energy, taking into account that to get Joules we need to convert the mass defected from grams to kilograms as follows:
[tex]Energy=2.58gH*\frac{1molH}{1.00782gH} *-0.027583gH/4molH*\frac{1kgH}{1000gH}*(299 792 458 m / s )^2\\Energy=-1.59x10^{12}J[/tex]
The obtained energy turns out negative since is a released type of energy.
Best regards.
