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Unit Eight Quiz Solutions and Unit Nine Goals. Mechanical Engineering 370 Thermodynamics Larry Caretto April 1, 2003. Outline. Solution to quiz eight Revised schedule Review second law Goals for unit eight Calculating entropy with ideal gases Constant and variable heat capacity
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Unit Eight Quiz Solutions and Unit Nine Goals Mechanical Engineering 370 Thermodynamics Larry Caretto April 1, 2003
Outline • Solution to quiz eight • Revised schedule • Review second law • Goals for unit eight • Calculating entropy with ideal gases • Constant and variable heat capacity • Isentropic calculations
Course Schedule Changes • Midterm on April 24 (Review April 22) • Move schedule for unit ten on April 22–24 up to April 8–10 • Unit ten quiz on April 22; no quiz on April 29 following midterm • Writing assignment due April 11 • Design project due May 16
The Second Law • There exists an extensive thermo-dynamic property called the entropy, S, defined as follows: dS = (dU + PdV)/T • For any process dS ≥ dQ/T • For an isolated system dS ≥ 0 • T must be absolute temperature
Entropy is a Property • If we know the state of the system, we can find the entropy • We can use the entropy as one of the properties to define the state • Use the following if we are given a value of s and a value of T or P • if s < sf(T or P) => compressed liquid • if s > sg(T or P) => gas (superheat) region • otherwise in mixed region
Reversible Processes • This is an idealization; we cannot do better than a reversible process • Internal reversibility has dS = dQ/T • Internal and external reversibility has dSisolated system = 0 • It is possible to have dS = dQ/T for a system with dSisolated system > 0
Maximum Work (Output) • dS dQ/T; if reversible dS = dQ/T • Compare two processes with between same states (dU = dUrev) • dS = dQrev/T = [dUrev + dWrev]/T dQ/T • [dUrev + dWrev]/T [dU + dW]/T • dWrev dW • Maximum work in a reversible process
Maximum Adiabatic Work (DS = 0) • From given inlet conditions, find the initial state properties including sinitial • The maximum work in an adiabatic process occurs when sfinal = sinitial • From sfinal = sinitial and one other property of final state get all final state properties • Find work from first law as done in previous quizzes and exercises
First Unit Nine Goal • As a result of studying this unit you should be able to compute entropy changes in ideal gases • using constant heat capacities • using equations that give heat capacities as a function of temperature • using ideal gas tables
Second Unit Nine Goal • As a result of studying this unit you should be able to compute the end states of isentropic processes in ideal gases • using constant heat capacities • using equations that give heat capacities as a function of temperature • using ideal gas tables
Ideal Gas Entropy • Entropy defined as ds = (du + Pdv)/T • We can write Tds = du + Pdv • Since du = d(h – Pv) = dh – Pdv – vdP • We can also write Tds = dh - vdP • Ideal gas: Pv = RT, du = cvdT, dh = cpdT • For ideal gases ds = cvdT/T + Rdv/v • For ideal gases ds = cpdT/T – RdP/P
Ideal Gas Entropy Change • Integrate ideal gas ds equations to get
Ideal Gas Entropy Tables • Define • So that
Example • Air is heated from 300 K to 500 K at constant pressure. What is Ds? • From table A-17, page 849, so(300 K) = 1.71865 kJ/kg∙K andso(500 K) = 2.21952 kJ/kg∙K; Ds = 0.50087 kJ/kg∙K • Assuming constant cp = 1.005 kJ/kg∙K gives Ds = cpln(T2/T1) = 1.005 ln(500/300) = 0.51338 kJ/kg∙K
Ideal Gas Isentropic Processes • Start with ds = cpdT/T – RdP/P • For ds = 0, cpdT/T = RdP/P • Integrate for ds = 0 and constant cp to get cpln(T2/T1) = R ln(P2/P1) so that ln(T2/T1) = R ln(P2/P1)R/Cp or T2/T1 = (P2/P1)R/Cp • R/cp = (cp – cv)/cp = (cp/cv – 1)/ (cp/cv) • R/cp = (k – 1)/k, where k = cp/cv
Ideal Gas Isentropic Processes • Final result: T2/T1 = (P2/P1)(k-1)/k • Can derive similar equations for other variables • T2/T1 = (v2/v1)(k-1) • P2/P1 = (v2/v1)k • Apply only to ideal gases with constant heat capacities in isentropic processes
Variable Heat Capacity • Set s2 – s1 = 0 in equations below for ideal gas isentropic process
Variable Heat Capacity • Can solve for volume or pressure ratios if T1 and T2 are given • A trial-and-error solution is required if T1 or T2 are unknown
Variable Heat Capacity Tables • For ideal gas, isentropic processes, with variable heat capacities we can define Pr(T), and vr(T) such that • v2/v1 = vr(T2)/ vr(T1) • P2/P1 = Pr(T2)/ Pr(T1) • Values of Pr(T), and vr(T) given in ideal gas tables • We still use Pv = RT at points
Example Problem • Adiabatic, steady-flow air compressor used to compress 10 kg/s of air from 300 K, 100 kPa to 1 MPa. What is the minimum work? • Minimum work in adiabatic process is when process is isentropic • First law:
Example Continued • What is outlet state for maximum work? Use ideal gas tables for air on page 849 • Pr(300 K) = 1.3860 • P2/P1 = Pr(T2)/ Pr(T1) so that • Pr(T2) = Pr(T1) P2/P1 = 1.3860(1000/100) • What is T with Pr = 13.860 • Pr(570 K) = 13.50; Pr(580 K) = 14.38 • Interpolate to get Pr = 13.86 at T = 574.1 K
Example Concluded • Use enthalpy data from ideal gas tables • hin = h(300 K) = 300.19 kJ/kg • hout = h(574.1 K) = 579.86 kJ/kg • Negative value shows work input • Minimum input in absolute value
Repeat Example with Constant cp • Here we use data for air that k = 1.4 and cp = 1.005 kJ/kg∙K • T2 = T1(P2/P1)(k – 1)/k = (300 K)[(1000 kPa)/(100 kPa)](1.4 – 1)/1.4 = 579.2 K