the train travels at 45 meters per each second
this question can be rewritten into the equation d = 45t, where d represents the distance traveled and t represents the time elapsed.
we are given two seperate times, so we can replace the variable t with each respective time. this leaves us with only one missing variable, so we can successfully isolate to find the other.
for i), we substitute t for 30 seconds, shown as follows
d = 45t
d = 45(30)
d = 1350m
for ii), we know that there are 60 seconds in every minute, so in multiplying 60 seconds by two we get the total amount of seconds in two minutes, which is 120.
we can now use 120 to substitute t in our equation
d = 45t
d = 45(120)
d = 5400m
hope this helps!!
Answer:
i) 1350 m
ii) 5400 m
Step-by-step explanation:
Formula for Speed
[tex]\boxed{\sf Speed=\dfrac{Distance}{Time}}[/tex]
Rearrange the formula so that Distance is the subject:
[tex]\implies \sf Distance = Speed \times Time[/tex]
Given:
Substitute the given values into the formula for distance:
[tex]\implies \sf Distance = 45 \times 30 = 1350\:m[/tex]
Given:
As the time is given in a different unit of time as the speed, we must first convert the time into seconds:
1 minute = 60 seconds
⇒ 2 minutes = 60 × 2 = 120 seconds
Therefore:
Substitute the values into the formula for distance:
[tex]\implies \sf Distance = 45 \times 120 = 5400\:m[/tex]
