When the video begins, you are indicating to turn left and are planning to turn off towards Flodafors.You are looking for a parking space and are driving at around 7 km/h for much of the video.Which of the following traffic situations is generally considered most hazardous?.Which statement is true at the coming junction? You intend to continue driving straight ahead.Do special rules apply when you are being overtaken?.Which statement is true regarding the cyclist when the centre line is continuous?.How should you think when you pass the 50 km/h signs? At the start of the video, you are driving on a road where the speed limit is 70 km/h.Which type of overtaking manoeuvre is generally preferred?.Which statement applies at the coming junction? At the start of the video, you are driving on a priority road.There is also a driving licence book online (2022). This is an example of one of the driving theory questions at Kö (also in theory tests in Arabic). We can then work out the time difference between both speeds: Only now can we use the formula Distance / speed = time: The speeds are therefore recalculated to m/s: Method 2 Colour codes for the figures (easier to keep track of them)įor the formula to work requires us to use metres instead of 10 km and metres per second (m/s) instead of kilometres an hour (km/h). It is however easier to understand if the answer is recalculated to seconds: 0.06 * 10 = 0.6 minutes time gain per 10 km.Therefore, recalculate the time gain per 10 km: However, the question is how much time you gain per 10 km, not per km. 0.6 - 0.54 = 0.06 minutes faster per km when travelling at 110 km/h compared with 100 km/h.It is therefore takes slightly less time with the higher speed. 60 / 110 = it takes 0.54 minutes to travel 1 km.60 / 100 = it takes 0.6 minutes to travel 1 km.We first calculate how many minutes it takes to travel 1 km at both speeds: Minutes per hour (since the speed is km/h, kilometres per hour) Method 1 Colour codes for the figures (easier to keep track of them) It is enough to know that the time gain is minimal. In all likelihood, you will not need to know the following mathematical calculations for the real test. – approximately ½ minute at speeds over 90 km/h” – approximately 1 minute at speeds under 90 km/h “ If you increase your average speed by 10 km/h, the time gain per 10 km will be: The options are not shown, since this is one of the 1000 paid questions.ĭriving Licence Book (19th Edition, page 84):
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