numbers of ways a person can travel from a to c via b, if there are 3 routes from a to b and 5 routes from b to c

3 ways from a to b

now, for each of those ways, there are 5 from b to c.

so, just multiply the two sets of ways.

Well, let's calculate that using my clown math! If there are 3 routes from a to b and 5 routes from b to c, we can multiply those together to get the total number of ways!

So, 3 routes from a to b, and for each of those routes, we have 5 routes from b to c. That means we can have a total of 3 * 5 = 15 different ways to travel from a to c via b.

But hey, don't stress about it! No matter which route you take, just remember to pack your sense of humor and a funny clown nose for the journey! Happy travels!

To calculate the number of ways a person can travel from point A to C via point B, we need to multiply the number of routes from A to B by the number of routes from B to C.

Given that there are 3 routes from A to B and 5 routes from B to C, we can calculate the total number of ways as follows:

Number of ways from A to B = 3
Number of ways from B to C = 5

Total number of ways = Number of ways from A to B * Number of ways from B to C
= 3 * 5
= 15

Therefore, there are 15 different ways a person can travel from point A to C via point B.

To find the number of ways a person can travel from point A to C via point B, we need to multiply the number of routes from A to B with the number of routes from B to C.

In this case, there are 3 routes from A to B and 5 routes from B to C. To find the total number of ways, simply multiply these two numbers together:

Number of ways = Number of routes from A to B × Number of routes from B to C
= 3 × 5
= 15

Therefore, there are 15 different ways a person can travel from A to C via B.