Transformer phasor diagrams

Reference notes

Use Next → on the narrator above to step through six configurations of the phasor diagram, from no-load through unity, lagging, and leading power factors.

What a phasor is

A phasor is the complex-amplitude representation of a sinusoid. Each AC quantity at frequency f — voltage, current, flux — is represented by a vector whose length is the RMS magnitude and whose angle is the phase shift relative to a chosen reference. The whole diagram rotates together at angular velocity ω = 2πf, but only the relative angles matter for steady-state analysis, so we draw the diagram frozen at one instant. The little wave panel in the corner is the time-domain projection of those rotating vectors — watch how the phase shifts in the diagram show up as horizontal shifts of the sinusoids.

Why Φ lags V₁ by 90°

From Faraday's law, V₁ ≈ −E₁ = +N₁·(dΦ/dt). If Φ = Φ_max·sin(ωt), then dΦ/dt = ωΦ_max·cos(ωt) — a cosine, which leads the sine by 90°. So V₁ leads Φ by 90°, equivalently Φ lags V₁ by 90°.

The no-load current I_e and its two components

With no load on the secondary, the primary still draws a small current I_e. It splits into:

• I_m (magnetising component) — in phase with Φ, sets up the alternating flux. Carries reactive power only.
• I_c (core-loss component) — in phase with V₁, supplies the hysteresis and eddy-current losses in the iron. Carries real power.

I_m dominates: typically I_m is 8–10× larger than I_c, so I_e sits very close to the Φ direction (about 80–85° behind V₁). When the secondary is open and I₂ = 0, the primary current I₁ is just this small magnetising current I_e — nothing more.

The load component I₂′

When a load is connected on the secondary, the secondary current I₂ flows. The MMF balance equation N₁·i₁′ = N₂·i₂ means the primary draws an additional load component I₂′ with magnitude (N₂/N₁)·|I₂| and in the same phase as I₂ (with the standard "dotted-end-in" current convention). The total primary current is the vector sum:

If the secondary is opened (I₂ = 0), I₂′ collapses to zero and I₁ falls back to I_e.

Unity, lagging, and leading load — what changes?

• Unity PF (resistive load): I₂ in phase with V₂, so I₂′ along V₁ direction. I₁ lags V₁ by only a small angle — basically I_e dragging I₁ slightly downward.
• Lagging PF (inductive load): I₂ lags V₂ by an angle θ. I₂′ rotates downward by the same angle. The angle by which I₁ lags V₁ increases, because both I_e and I₂′ now point downward.
• Leading PF (capacitive load): I₂ leads V₂. I₂′ rotates upward. I₁ may end up slightly leading V₁ — but only slightly, because the magnetising current I_e always drags it down. The lead angle of I₁ is always less than the lead angle of I₂.

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