English: Animation showing
standing waves on a
half-wave dipole antenna driven by a sinusoidal voltage
VO from a radio transmitter at its
resonant frequency. The oscillating voltage pushes the electrons back and forth along the two metal rods that make up the antenna, creating oscillating currents
(blue arrows) in the antenna, charging its ends alternately positive (+) and negative (-). Since at this frequency the antenna is a half
wavelength (λ/2) long, a sinusoidal wave of voltage or current takes exactly one cycle to make the round trip from one end of the antenna to the other and back, so the reflected waves reinforce each other. The antenna acts like an electronic
resonater. Waves of current and voltage reflecting back and forth between the ends of the rods interfere to form
standing waves. The standing waves are shown graphically by bars of color (
red for voltage V(x) and
blue for current I(x)) whose width at each point is proportional to the
amplitude of the wave at that point. There are voltage
antinodes (maxima) and current
nodes (zero points) at each end, where positive (+) and negative (−) charges accumulate alternately each half cycle, while there is a voltage node and current antinode at the drive point in the center. The large oscillating voltages and currents on the antenna at resonance causes it to radiate maximum radio wave power.
The zero voltage reference for the voltage waves, as is customary in these graphs, is halfway between the voltage on the two transmission line conductors. The blue arrows show the direction of
conventional current, flow of positive charge; the direction of flow of the electrons in the antenna is opposite to the arrows. The oscillations are shown slowed down enormously; the current in actual radio antennas oscillates back and forth between ten thousand and one billion cycles per second.