Roberta is planning to buy a new car the different options she have is
1) Regular transmission or heavy duty towing transmission
2) two-door, four-door, or five-door
3)color: sleek silver, midnight black, upward grey, bold blue, or steady red
In how many different ways can she order her new car?
To determine the total number of different ways that Roberta can order her new car, we need to multiply the number of choices for each option.
1) For the transmission, she has 2 options: regular or heavy-duty towing. Therefore, there are 2 possibilities.
2) For the number of doors, she has 3 options: two-door, four-door, or five-door. Hence, there are 3 possibilities.
3) For the color, she has 5 options to choose from: sleek silver, midnight black, upward grey, bold blue, or steady red. Thus, there are 5 possibilities.
To find the total number of different ways, we multiply the options for each choice:
Total number of different ways = 2 transmission options × 3 door options × 5 color options = 2 × 3 × 5 = 30.
Therefore, Roberta can order her new car in 30 different ways.
To determine the number of different ways Roberta can order her new car, we need to multiply the number of options for each category.
1) For the transmission, she can choose either a regular transmission or a heavy-duty towing transmission. Therefore, there are 2 options.
2) For the car type, she can choose between a two-door, four-door, or five-door car. This gives her 3 options.
3) For the color, she has 5 options to choose from: sleek silver, midnight black, upward grey, bold blue, or steady red.
To find the total number of different ways she can order her car, we multiply the number of options for each category together:
Total number of ways = Options for transmission × Options for car type × Options for color
= 2 × 3 × 5
Therefore, Roberta can order her new car in 2 × 3 × 5 = 30 different ways.