Theory and Calculation of Transient Electric Phenomena and Oscillations Formula Map
Formula Map
Section titled “Formula Map”Review layer: these are OCR/PDF-text formula candidates. Promote only after scan verification, mathematical transcription, and notation review.
300
Formula and equation candidates.
93
Strong formula candidates.
76
Reviewable relation candidates.
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Formula Families
Section titled “Formula Families”| Family | Candidates |
|---|---|
| Transients, Oscillation, And Damping | 300 |
Highest-Priority Candidates
Section titled “Highest-Priority Candidates”| Candidate | Family | OCR/PDF text | Routes |
|---|---|---|---|
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0272strong-formula-candidate | transients-oscillation | At the moment 0 = 0, let the e.m.f. e = E cos (0 - 00) be | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0276strong-formula-candidate | transients-oscillation | Since e = E cos (0 - 00) = impressed e.m.f., | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0296strong-formula-candidate | transients-oscillation | i = -z | cos (I? - 00- 0J- i~x° cos (00 + OJ j (9) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0137strong-formula-candidate | transients-oscillation | i = I cos (d - 45°), | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0193strong-formula-candidate | transients-oscillation | e = ir (l - -J; (10) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0196strong-formula-candidate | transients-oscillation | t = 0, i = iv log cii = 0, c = - , | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0236strong-formula-candidate | transients-oscillation | t = 26.8 log ) + 79.6 (37) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0237strong-formula-candidate | transients-oscillation | t = 26.8 log e - 17.9 log (31.25 - 0.125 e) - 0.8. (38) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0258strong-formula-candidate | transients-oscillation | t = 0.04 log e - 0.01333 log (600 - e) - 0.08. (44) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0263strong-formula-candidate | transients-oscillation | t = 0.0274 log e - 0.00073 log (876 - e) - 0.1075, (45) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0278strong-formula-candidate | transients-oscillation | i = 7 cos (6 - d) + A£~a°, (2) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0285strong-formula-candidate | transients-oscillation | E cos 00 - Ir cos d - Ix sin d = 0, | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0286strong-formula-candidate | transients-oscillation | E sin 00 - Ir sin d + Ix cos d = 0, | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0292strong-formula-candidate | transients-oscillation | i = - cos (0 - 00 - 0X) + As x , (7) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0300strong-formula-candidate | transients-oscillation | i =— cos (d - 60 - ^)-cos (00 + 0,)- e* . (10) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0153strong-formula-candidate | transients-oscillation | Let e0 = 125 volts = impressed e.m.f. of the circuit, and | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0184strong-formula-candidate | transients-oscillation | e.m.f., and the constants of the circuit then are: e0 = 250 | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0146strong-formula-candidate | transients-oscillation | Hence, eQ = ir + L - > (1) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0148strong-formula-candidate | transients-oscillation | hence, i = il + (i0 - t\) e ’ , (3) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0165strong-formula-candidate | transients-oscillation | Let, in a continuous-current shunt motor, e0 = 250 volts = | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0271strong-formula-candidate | transients-oscillation | it is usually employed, the reactance x = 2 nfL, where / = fre- | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0136strong-formula-candidate | transients-oscillation | e = E cos 0, | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0192strong-formula-candidate | transients-oscillation | and since full speed S and full flux <I>0 generate an e.m.f. e0 = | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0275strong-formula-candidate | transients-oscillation | or, by substituting 6 = 2 nft, x = 2 nfL, the e.m.f. consumed | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0072strong-formula-candidate | transients-oscillation | P = ie (1) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0073strong-formula-candidate | transients-oscillation | <E> = Li = the intensity of the electromagnetic field. (2) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0074strong-formula-candidate | transients-oscillation | Mf = Ce = the intensity of the electrostatic field. (3) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0075strong-formula-candidate | transients-oscillation | et = ri, (4) | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0077strong-formula-candidate | transients-oscillation | or, by equation (2) : <J> = Li by definition, thus : | source research review |
theory-calculation-transient-electric-phenomena-oscillations-eq-candidate-0078strong-formula-candidate | transients-oscillation | - = L-,and: P’ = Lt-, (7) | source research review |