1,000 KHz = 1 MHz
0.48 KHz = 480 HzPeriod = 1/frequency = 1/480 = 0.0020833 second (rounded) = 21/12 milliseconds
Frequency = 1/period1/7.5 x 10-3 = 1331/3 Hz = 2/15 KHz
0.47 kHz = 0.47 x 1000 Hz = 470Hz which means that there are 470 cycles per second. So the period of 1 cycle is (1/470) time units
Period = 1/frequency = 1/50,000 = 0.00002 second = 20 microseconds
1,000 KHz = 1 MHz
BW = (1 MHz - 10 KHz) = (1,000 KHz - 10 KHz) = 990 KHz
1,000 Hz = 1 KHz 1,980 Hz = 1.980 KHz
1 mhz =1000khz
1 MHz = 1,000 KHz 1 GHz = 1,000 MHz = (1,000 x 1,000) = 1,000,000 KHz 3.2 GHz = (3.2 x 1,000 x 1,000) = 3,200,000 KHz
If 10 V input causes a frequency shift of 4 kHZ then 2,5v causes a freuency shift of 1 kHz. The input signal frequency of 1 kHz is irelevant.
The Nyquist frequency for a signal with a maximum bandwidth of 1 KHz is 500 Hz, however that will lead to aliasing unless perfect filters are available. The Nyquist rate for a signal with a maximum bandwidth of 1 KHz is 2 KHz, so the answer to the question is 2 KHz, or 500 microseconds.
If the intelligence signal striking a microphone was doubled in frequency from 1 kHz to 2 kHz with constant amplitude, (fc) would change from 1 kHz to 2 kHz. Because the intelligence amplitude was not changed, however, the amount of frequency deviation above and below fc will remain the same. On the other hand, if the 1 kHz intelligence frequency were kept the same but its amplitude were doubled, the rate of deviation above and below fc would remain at 1 kHz, but the amount of frequency deviation would double.
As 1 GHz = 1,000,000,000 (109) Hz and 1 KHz = 1,000 (103) Hz, to convert GHz to KHz, you'll have to divide by 1,000,000 or 106 to get your answer. Example: 1 GHz converted to KHz = 109 / 103 = 106 or 1,000,000 KHz
.001 seconds.
AM radios can use frequencies in the range 535 kHz to 1605 kHz. Frequencies are assigned at 10 kHz intervals, from 540 kHz to 1600 kHz.
To calculate the time of the cycle you just invert the Hz value. Hz = 1 / T, Where T is the time of the cycle in seconds so a 10,000Hz signal has a time of each cycle of: 0.0001 seconds.