Answer:
The mass flow rate of cooling water required to cool the refrigerant is [tex]123.788\,\frac{kg}{min}[/tex].
Explanation:
A condenser is a heat exchanger used to cool working fluid (Refrigerant 134a) at the expense of cooling fluid (water), which works usually at steady state. Let suppose that there is no heat interactions between condenser and surroundings.The condenser is modelled after the First Law of Thermodynamics, which states:
[tex]\dot Q_{ref} - \dot Q_{w} = 0[/tex]
[tex]\dot Q_{ref} = \dot Q_{w}[/tex]
[tex]\dot m_{ref}\cdot (h_{ref, in} - h_{ref,out}) = \dot m_{w}\cdot (h_{w, out} - h_{w,in})[/tex]
The mass flow rate of the cooling water is now cleared:
[tex]\dot m_{w} = \dot m_{ref }\cdot \frac{h_{ref,in}-h_{ref,out}}{h_{w,out}-h_{w,in}}[/tex]
Given that [tex]h_{ref,in} = 808.34\,\frac{kJ}{kg}[/tex], [tex]h_{ref, out} = 88.82\,\frac{kJ}{kg}[/tex], [tex]h_{w,out} = 104.83\,\frac{kJ}{kg}[/tex] and [tex]h_{w,in} = 62.98\,\frac{kJ}{kg}[/tex], the mass flow of the cooling water is:
[tex]\dot m_{w} = \left(7.2\,\frac{kg}{min} \right)\cdot \left(\frac{808.34\,\frac{kJ}{kg}-88.82\,\frac{kJ}{kg} }{104.83\,\frac{kJ}{kg}-62.98\,\frac{kJ}{kg} } \right)[/tex]
[tex]\dot m_{w} = 123.788\,\frac{kg}{min}[/tex]
The mass flow rate of cooling water required to cool the refrigerant is [tex]123.788\,\frac{kg}{min}[/tex].
