Transmission Lines
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Uploaded by ConstructiveJasper986
Polytechnic University of the Philippines
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Summary
This document provides an overview of transmission lines, including their behavior at low and high frequencies, and different types of transmission lines. It also discusses losses in transmission lines.
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TRANSMISSION LINES a metallic conductor system Behavior of Transmission Lines used to transfer electrical energy from one point to At low frequencies: another. o Resistive ...
TRANSMISSION LINES a metallic conductor system Behavior of Transmission Lines used to transfer electrical energy from one point to At low frequencies: another. o Resistive A material medium or structure that forms a path for o Ideal directing the transmission of energy from one place to o No loss another o No reactance Impedance matching circuits At high frequencies: Basic Kinds of Waves o Becomes complex o There are RLCG in the circuit a) Based on the direction of signal REMINDER: Source Load The smaller the diameter of the wire, the higher the resistance The longer the transmission line, the higher the Incident Waves resistance 𝑷𝒊𝒏𝒄 +𝒅𝒃 = 𝟏𝟎𝒍𝒐𝒈 𝑷𝒓𝒆𝒇 Reflected Waves 𝑷𝒓𝒆𝒇 LOSSES IN TRANSMISSION LINES −𝒅𝒃 = 𝟏𝟎𝒍𝒐𝒈 𝑷𝒊𝒏𝒄 1. Conductor heating loss 𝑷𝒐𝒖𝒕 = 𝑷𝒊𝒏𝒄 − 𝑷𝒓𝒆𝒇 also called I2R loss and power loss increases with frequency because of skin effect b) Based on the displacement of signal Solutions to Skin Effect Longitudinal wave – the displacement of the o increase the diameter of the conductor medium is parallel to the propagation of the o Let the conductor be plated with silver wave. o Use multi-stranded wire Transverse wave – the displacement of the 2. Dielectric heating medium is perpendicular to the direction of It increases with frequency because of gradually propagation of the wave. worsening properties with increasing frequency for any given dielectric medium. Observable in solid dielectric but remains TYPES OF TRANSMISSION LINES negligible for air dielectric BALANCED LINE/PARALLEL WIRE/DIFFERENTIAL LINE 3. Radiation loss Occurs because transmission line may act as an Common examples are open wire transmission line, antenna if the separation of the conductor is Twin Lead or Ribbon Cable, Twisted-Pair Cable. appreciable fraction of a wavelength. made up of two parallel conductors spaced from one The loss increases with frequency another by a distance of /12 inch up to several inches. Can be reduced by properly shielding. Two conductors carry current; one conductor carries 4. Coupling Loss the signal and the other is the return. Occurs when two separate lines are o Metallic circuit currents – currents flow in connected/reconnected together. opposite directions Mechanical connections are discontinuities o Longitudinal circuit currents – currents flow which tend to heat up, radiate energy and in the same directions dissipate heat. UTP – Unshielded Twisted Pair Types of Coupling Loss STP – Shielded Twisted Pair o Lateral management UNBALANCED LINE/COAXIAL LINE/SINGLE-ENDED LINE o Gap displacement o Angular misalignment Consist of a solid center conductor surrounded by a plastic 5. Corona or spark insulator. A luminous discharge between two conductors of Second conductor, a shield made of fine wires for ground transmission line potential. Occurs when the difference potential between Where : u = permeability them exceeds the breakdown voltage of the u = uR x Uo dielectric uo = 1. 257 x 10-6 H/m or 4π x10-7 H/m Permeability – measure of the superiority of GENERAL EQUIVALENT CIRCUIT OF TRANSMISSION LINES material over a vacuum as a path for magnetic lines of force Capcitance (C), F/m 𝜋𝜀 𝐶= 𝑠 𝑙𝑛 𝑟 Where : Ɛ = permittivity A. Primary Line Constants Ɛ=ƐRxƐo Resistance Inductance Ɛ o = 8.854 x 10-12 F/m or 1/36π x10-12 F/m Capacitance Permittivity – ability to concentrate magnetic lines Conductance of force; pertains to the dielectric constant B. Secondary Line Constants Characteristic impedance Propagation constant Resistance (R), Ω/m o Attenuation Constant o Phase constant 1 𝑅= 𝜋𝑟𝛿𝜎𝑐 Where : δ = skin depth of the cable Telegrapher’s Equation/Telegraph Equation σo = conductivity of the conductor Pairs of couples, linear differential equations that describe the voltage and current on an electrical transmission line with distance and time Conductance (G), mho/m 𝜋𝜎 𝐺= For Parallel Wire Line 𝑐𝑜𝑠ℎ−1 𝑠 2𝑟 Where : σ = conductivity of the dielectric For Coaxial Line Where : s = spacing between the conductor r = radius of the conductor Inductance (L), H/m Where : a = radius of the inner conductor 𝜇 𝑠 𝐿= 𝑙𝑛 b = radius of the outer conductor 𝜋 𝑟 Inductance (L), H/m It is the impedance measured at the input of the 𝜇 line when its length is infinite. 𝐿= 𝑏 2𝜋 (𝑙𝑛 ) 𝑎 Capcitance (C), F/m Note: 2𝜋𝜀 A line terminated in its Zo is called non-resonant, 𝐶= resistive or flat line. 𝑏 𝑙𝑛 𝑎 The V and I of a lossless line are constant in phase. Resistance (R), Ω/m The V and I of a line with loss are reduced exponentially. 1 𝑅= 1 1 2𝜋𝑟𝛿𝜎𝑐 ( + ) 𝑎 𝑏 Zo of Transmission Line Conductance (G), mho/m 2𝜋𝜎 𝑍 𝐺= 𝑍𝑜 = √ 𝑏 𝑌 𝑙𝑛 𝑎 𝑹 + 𝒋𝝎𝑳 𝒁𝒐 = √ 𝑮 + 𝒋𝝎𝑪 Velocity Factor (Vf) Where : Z = shunt impedance the velocity reduction ratio of the electromagnetic waves that depends on the nature of the medium Y = shunt admittance through which they travel 𝑽𝒄 𝟏 At Radio Frequency 𝑽= ; 𝑽𝒇 = ; 𝑽 = 𝑽𝒄 𝑽𝒇 √𝒌 √𝒌 ωL >> R Where : V = velocity of the medium ωC >> G 8 Vc = velocity of light in a vacuum (3 x 10 m/s) 𝑳 𝒁𝒐 = √ 𝑪 k = dielectric constant of the medium At Audio Frequency Vf = velocity factor R >> ωL MATERIAL DIELECTRIC CONSTANT (k) G >> ωC Vacuum 1.0 Air 1.0006 Teflon 2.1 𝑹 𝒁𝒐 = √ Polyethylene (PE) 2.27 𝑮 Polystyrene 2.5 Paper, paraffined 2.5 Rubber 3.0 Nature of Transmission Line Polyvinyl chloride (PVC) 3.3 Mica 5.0 Glass 7.5 Characteristic Impedance (Zo) also called surge impedance or intrinsic impedance refers to the impedance that a cable presents to an electrical signal, determined by the cable’s physical structure—the arrangement of conductors, dielectric material, and dimensions. Zo based on Physical Dimension 𝟏𝟑𝟖 𝑫 𝒁𝒐 = 𝒍𝒐𝒈 √𝒌 𝒅 Geometry of the conductor Size of the conductor 138 𝐷 𝑍𝑜 = 𝑙𝑜𝑔 Spacing of the conductor √𝑘 2𝑟 Dielectric constant of the insulator 60 𝐷 𝑍𝑜 = 𝑙𝑛 √𝑘 𝑑 For Parallel Wire Line Note: if the outer diameter of the outer conductor (Do) is involved use the ff. formula: 𝑫𝒐 = 𝑫 + 𝟐𝒉 Where : Zo = character impedance k = dielectric constant D = inside diameter of the outer conductor d = diameter of the inside conductor 𝟐𝟕𝟔 𝟐𝒔 𝒁𝒐 = 𝒍𝒐𝒈 √𝒌 𝒅 Propagation Constant (δ) 276 𝑠 𝑍𝑜 = 𝑙𝑜𝑔 A secondary line constant √𝑘 𝑟 Determines the variation of current and voltage with 120 𝑠 distance along a transmission line and is found to 𝑍𝑜 = 𝑙𝑛 √𝑘 𝑟 vary exponentially. Note: if the diameter of the conductor is not equal use the ff. 𝐼 = 𝐼𝑠𝑒 −𝛿𝑥 formula: 𝑉 = 𝑉𝑠𝑒 −𝛿𝑥 𝒅 = √𝒅𝟏 + 𝒅𝟐 Where : δ = propagation constant Where : Zo = character impedance x = distance k = dielectric constant Is = magnitude of the current s = spacing of conductors from center to center Vs = magnitude of the voltage d = diameter of the conductor s = sending end or input r = radius of the conductor The propagation constant also depends on primary line constants and the angular velocity of the signal. Reminder: 𝜹 = √𝒁𝒀 Characteristic impedance is inversely proportional to dielectric constant 𝜹 = √(𝑹 + 𝒋𝝎𝑳)(𝑮 + 𝒋𝝎𝑪) If Zo is in minimum value (Zomin), s = d 𝛿 =∝ +𝑗𝛽 Where : a = attenuation constant (dB/uL, Neper/uL) For Coaxial Line = determines how V and I decreases with distance along the line 1 db = 0.115 Neper 1 Neper = 8.686 dB β = phase shift/phase delay constant (°/uL, rad/uL) = determines the phase angle of the V and I 𝟐𝝅 𝛌= variation with distance 𝜷 𝟑𝟔𝟎 𝛌= For Lossless Line: 𝜷 If : L/R = C/G Unit = uL Therefore : C = LG/R Two Types of Transmission Line Length 𝑮 𝜹 = (𝑹 + 𝒋𝝎𝑳)√ 𝑹 1. Physical Length (S) Also called the mechanical length (unit: in, m, But if : G/R = C/L cm, etc.) 2. Electrical Length (°ƪ) 𝐺 𝐶 𝛿 = (𝑅 + 𝑗𝜔𝐿)√ → 𝛿 = (𝑅 + 𝑗𝜔𝐿)√ °ƪ = 𝜷𝑺 𝑅 𝐿 𝝎 °ƪ = 𝑺 𝑪 𝑽 𝜹 = 𝑹√ + 𝒋𝝎√𝑳𝑪 𝑳 𝟐𝝅𝒇 𝟑𝟔𝟎𝒇 °ƪ = 𝑺 𝒐𝒓 °ƪ = 𝑽 𝑽 Therefore: Unit = rad/uL or °/uL 𝐶 ∝= 𝑅√ 𝐿 Delay Lines 𝛽 = 𝜔√𝐿𝐶 Transmission lines designed to intentionally introduce a time delay in the path of an electromagnetic wave Speed of Propagation (Velocity, V) 𝑡𝑑 = 𝐿𝐶 At any condition: Where : td = time delay (s) 𝑫 𝑽= L = inductance (H) 𝑻 𝑫 C = capacitance (C) 𝑽= 𝑳𝑪 𝑡𝑑 = 1.016𝑘 𝑽 = 𝝀𝒇 𝝎 𝑽= ; 𝜷 = 𝜔√𝐿𝐶 𝜷 Things that may happen when the signal reaches the load: 𝟏 1. All signals that go to the load is totally absorbed by the 𝑽= √𝑳𝑪 load. (Zo = ZL) 2. Only portion or part of a signal is absorbed by the load. (mismatch) Wavelength (λ) 3. No signal is absorbed by the load (total reflection) the line is shorted (ZL = 0), or the line is open (ZL = ꚙ); or 𝑽 𝜔 𝛌= ; 𝑉= perfectly unmatched. 𝒇 𝛽 𝜔 λ= 𝛽𝑓 2𝜋𝑓 λ= 𝛽𝑓