1. Describe what each of the following lines on a distance-time graph represents. [3]
a) A horizontal line
b) A straight line sloping upward
c) A curved line that becomes steeper
9. A distance-time graph has three sections: a straight line of gradient 4 m/s for 10 s, a horizontal section for 5 s, then a straight line of gradient 6 m/s for 10 s. [4]
a) What is the total distance travelled?
b) What is the average speed for the whole journey?
Mark Scheme
1. a) Object is stationary (distance is not changing) [1]; b) Object is moving at constant speed [1]; c) Object is accelerating (speed is increasing) [1] [3]
2. Object A has greater average speed [1]; because it covers the same distance in less time (speed = d/t, smaller t gives larger v) [1] [2]
3. Calculate the gradient of the line [1]: gradient = change in distance ÷ change in time [1] [2]
4. $v = d/t = 120 \div 80 = 1.5\,\text{m/s}$ [2]
5. $v = 400 \div 50 = 8\,\text{m/s}$ [2]
6. $d = vt = 12 \times 30 = 360\,\text{m}$ [2]
7. $v = 150 \div 50 = 3\,\text{m/s}$ [2]
8. Convert: 3 min = 180 s [1]; $v = 360 \div 180 = 2\,\text{m/s}$ [1] [2]
9. a) Section 1: $4 \times 10 = 40\,\text{m}$; Section 2: 0 m; Section 3: $6 \times 10 = 60\,\text{m}$; Total = 100 m [2]; b) Total time = 25 s; average speed = $100 \div 25 = 4\,\text{m/s}$ [2] [4]
10. Convert km to m: $360\,\text{km} = 360\,000\,\text{m}$ [1]; convert hours to seconds: $4\,\text{h} = 14\,400\,\text{s}$ [1]; $v = 360\,000 \div 14\,400 = 25\,\text{m/s}$ [1] [3]