Convert Nanohenry to Henry
Unit definitions
Nanohenry
$\frac{1}{10^{9}} \ \text{H}$ is a nanohenry.
Henry
The henry is the SI unit of electric inductance. It is defined as the amount of inductance required to induce an electromotive force (EMF) of one volt when the current is changing at a rate of one ampere per second.
How to convert Nanohenry to Henry
$$\text{Electric Inductance}_{\text{H}} = \frac{\text{Electric Inductance}_{\text{nH}}}{{10}^{9}}$$
Examples
Example 1
Convert $20.0\ \text{nH}$ to $\text{H}$.
$$\text{Electric Inductance}_{\text{H}} = \frac{20.0}{{10}^{9}}$$
$$\text{Electric Inductance}_{\text{H}} = 0.00000002$$
$$\therefore \ 20.0\ \text{nH} = 0.00000002 \ \text{H}$$
Example 2
Convert $70.0\ \text{nH}$ to $\text{H}$.
$$\text{Electric Inductance}_{\text{H}} = \frac{70.0}{{10}^{9}}$$
$$\text{Electric Inductance}_{\text{H}} = 0.00000007$$
$$\therefore \ 70.0\ \text{nH} = 0.00000007 \ \text{H}$$
Example 3
Convert $110.0\ \text{nH}$ to $\text{H}$.
$$\text{Electric Inductance}_{\text{H}} = \frac{110.0}{{10}^{9}}$$
$$\text{Electric Inductance}_{\text{H}} = 0.00000011$$
$$\therefore \ 110.0\ \text{nH} = 0.00000011 \ \text{H}$$
Example 4
Convert $130.0\ \text{nH}$ to $\text{H}$.
$$\text{Electric Inductance}_{\text{H}} = \frac{130.0}{{10}^{9}}$$
$$\text{Electric Inductance}_{\text{H}} = 0.00000013$$
$$\therefore \ 130.0\ \text{nH} = 0.00000013 \ \text{H}$$
Example 5
Convert $165.0\ \text{nH}$ to $\text{H}$.
$$\text{Electric Inductance}_{\text{H}} = \frac{165.0}{{10}^{9}}$$
$$\text{Electric Inductance}_{\text{H}} = 0.000000165$$
$$\therefore \ 165.0\ \text{nH} = 0.000000165 \ \text{H}$$
Nanohenry to Henry conversion table
Convert Nanohenry to other Electric Inductance units
| Nanohenry [nH] | Other unit |
|---|---|
| 1 | 0.000001 Millihenry [mH] |
| 1 | 0.001 Microhenry [μH] |
| 1 | 1E+3 Picohenry [pH] |
| 1 | 1E-12 Kilohenry [kH] |
| 1 | 1E-15 Megahenry [MH] |