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Math  /  Algebra

QuestionA power station gets rid of 600 MW of surplus energy into a nearby river. The river is 20 m wide, 3.0 m deep and flows at 1.2 m s11.2 \mathrm{~m} \mathrm{~s}^{-1}. Calculate the temperature rise.

Studdy Solution

STEP 1

1. The power station releases 600 MW of energy into the river.
2. The river is 20 meters wide, 3.0 meters deep, and flows at a speed of 1.2m/s1.2 \, \mathrm{m/s}.
3. We need to calculate the temperature rise of the river water.

STEP 2

1. Calculate the volume flow rate of the river.
2. Calculate the mass flow rate of the river.
3. Use the energy balance to find the temperature rise.

STEP 3

Calculate the volume flow rate of the river.
The volume flow rate Q Q is given by the product of the cross-sectional area A A of the river and the flow velocity v v .
A=width×depth=20m×3.0m=60m2 A = \text{width} \times \text{depth} = 20 \, \mathrm{m} \times 3.0 \, \mathrm{m} = 60 \, \mathrm{m}^2
Q=A×v=60m2×1.2m/s=72m3/s Q = A \times v = 60 \, \mathrm{m}^2 \times 1.2 \, \mathrm{m/s} = 72 \, \mathrm{m}^3/s

STEP 4

Calculate the mass flow rate of the river.
The mass flow rate m˙ \dot{m} is given by the product of the volume flow rate Q Q and the density ρ \rho of water (assuming ρ=1000kg/m3 \rho = 1000 \, \mathrm{kg/m}^3 ).
m˙=Q×ρ=72m3/s×1000kg/m3=72000kg/s \dot{m} = Q \times \rho = 72 \, \mathrm{m}^3/s \times 1000 \, \mathrm{kg/m}^3 = 72000 \, \mathrm{kg/s}

STEP 5

Use the energy balance to find the temperature rise.
The energy added to the river is 600MW=600×106J/s 600 \, \mathrm{MW} = 600 \times 10^6 \, \mathrm{J/s} .
The temperature rise ΔT \Delta T can be calculated using the formula:
P=m˙×c×ΔT P = \dot{m} \times c \times \Delta T
Where P P is the power added, m˙ \dot{m} is the mass flow rate, c c is the specific heat capacity of water (approximately 4186J/(kg°C) 4186 \, \mathrm{J/(kg \cdot °C)} ), and ΔT \Delta T is the temperature rise.
Rearranging for ΔT \Delta T :
ΔT=Pm˙×c=600×106J/s72000kg/s×4186J/(kg°C) \Delta T = \frac{P}{\dot{m} \times c} = \frac{600 \times 10^6 \, \mathrm{J/s}}{72000 \, \mathrm{kg/s} \times 4186 \, \mathrm{J/(kg \cdot °C)}}
ΔT600×10672000×4186 \Delta T \approx \frac{600 \times 10^6}{72000 \times 4186}
ΔT1.99°C \Delta T \approx 1.99 \, °C
The temperature rise of the river water is approximately:
1.99°C \boxed{1.99 \, °C}

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