Answer:
40,320
Step-by-step explanation:
We are given that there are 8 train cars and 1 engine.
We will fix the first place for the engine.
So, we are left with 8 options for the next place.
Now, if we fix the second place for any one of the train cars.
We will be left with 7 options for the next place.
Going on this way until there is no place left for the train cars, we get the relation,
Total number of ways to arrange the train = 1 × 8 × 7 × 6 × 5 × 4 × 3 × 2 × 1
i.e. Total number of ways to arrange the train = 1 × 8! = 8! = 40,320
Hence, the total number of ways to arrange the train is 40,320.
Answer:
Step-by-step explanation:
the fewest number you would have to answer to get 350 would be 25.
to get the fewest number you would not be able to miss any before reaching 350 points. since you are aiming for a minimum of 350 points and you start out with 100 you would divide 250 by 10 to get 25
Answer:
27 websites
Step-by-step explanation:
Tomar found 14. Jay found 6 of the 14. Subtract 6 from 14 and you get 8. Add the 5 to the 8. You'll get 13. Now add 14 and 13 together. The total is 27. Tomar and Jay found 27 websites in all.
Answer:
156
Step-by-step explanation:
Using PEMDAS: We do the paranthese first:
7 * 22 + (8-2) / 3.
7 * 22 + 6 / 3.
Multiply / Divide:
154 + 6 / 3
154 + 2
156
You multiply 7 and 22 than add (8-2) than divide 3 than you will get 156