---
title: "Beregning af frem- og retur temperatur"
date: "2025-12-16"
created: "2025-12-16"
---

[Hjem](https://www.aabenraa-fjernvarme.dk/)

                    [Din fjernvarme](https://www.aabenraa-fjernvarme.dk/din-fjernvarme)

                [Beregning af frem- og retur temperatur](https://www.aabenraa-fjernvarme.dk/din-fjernvarme/beregning-af-frem-og-retur-temperatur)

# Beregning af frem- og retur temperatur

Når vi beregner din motivationstarif, bruger vi et middeltal på frem og returtemperaturen, gennem et helt år eller en periode.

Eksempel på beregning af gennemsnitstemperaturen:| Aflæsningsdato | M3 | E8 | E9 |
| --- | --- | --- | --- |
| 31-05-2017 (Slutdato) | 534,24 | 38236 | 18654 |
| 01-06-2016 (Startdato) | 236,87 | 20123 | 7651 |
| **Årsforbrug** | **297,37** | **18113** | **11003** |

Gennemsnitlig fremløbstemperatur E8/m3 = 18113:297,37 = **60,9 C**

Gennemsnitlig returtemperatur E9/m3 = 11003:297,37 = **37,0 C**

Eksemplet viser en god returtemperatur iht. nedenstående tabel

![](https://www.aabenraa-fjernvarme.dkhttps://cdn.moliri.dk/image/moliri-public/softvaerket/thumbnail?filename=IntegrationPlaceholder.pdf&folderPath=Den+globale+mappe&width=800 "data:image/png;base64,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")![](https://www.aabenraa-fjernvarme.dk/i/MOLIRIMEDIA/4b66cdd9-1bf0-4ae2-0f58-08de013c75e3?width=800)

Afregningen af pristillæg foretages iht. ovenstående tabel. Heraf fremgår den max gennemsnitlig returtemperatur ift. fremløbstemperatur, målt på forbrugerens energimåler, over et helt år. Er returtemperaturen højere end max returtemperatur afregnes et tillæg.

**Her kan du selv beregne din gennemsnitstemperatur**

For at beregne gennemsnitstemperaturen skal du bruge E8, E9 og m3, som kan aflæses på din fjernvarmemålers display. Dette gælder for målertype **Multical 402**, **Multical 601** og **Multical 602**.

Tabel til udregning af din gennemsnitlige frem- og returtemperatur finder du ved at klikke **[her](https://www.aabenraa-fjernvarme.dk/p/Aabenraa Fjernvarme/Filer/Motivationstarif/beregning-af-gennemsnitstemperatur.xlsx.xlsx "beregning-af-gennemsnitstemperatur.xlsx.xlsx").**

Sådan finder du E8, E9 og m3 på din måler:

**E8**

- Ved start skal måleren stå på MWh.
- Tryk 3 gange på pilen. Displayet viser herefter T1.
- Tryk 3 gange på arkivtasten. Displayet viser herefter **E8**.

**E9**

- Ved start skal måleren stå på MWh.
- Tryk 4 gange på pilen. Displayet viser herefter T2.
- Tryk 3 gange på arkivtasten. Displayet viser herefter **E9**.

**M3**

- Ved start skal måleren stå på MWh.
- Tryk 1 gange på pilen. Displayet viser herefter **M3**.