Or the cars in a used car lot 2/5 are gray, 1/3 are electic
To calculate the number of gray cars, let's assume the used car lot has a total of 100 cars.
The fraction of gray cars is 2/5. So, the number of gray cars is (2/5) * 100 = 40.
Similarly, the fraction of electric cars is 1/3. So, the number of electric cars is (1/3) * 100 = 33.33 (approximated to 33).
Therefore, in a used car lot of 100 cars, there are 40 gray cars and 33 electric cars.
To determine the cars that are gray and electric, we can follow these steps:
Step 1: Find the total number of cars on the used car lot. Let's assume there are "x" cars in the lot.
Step 2: Calculate the number of gray cars on the lot. Given that 2/5 of the cars are gray, we can express it as a fraction: (2/5) * x. This represents the number of gray cars.
Step 3: Calculate the number of electric cars on the lot. Given that 1/3 of the cars are electric, we can express it as a fraction: (1/3) * x. This represents the number of electric cars.
Therefore, the number of gray cars is (2/5) * x and the number of electric cars is (1/3) * x.
To find the number of cars that are gray and electric in a used car lot, we need to calculate the fractions of cars that have these characteristics separately and then determine the respective values based on the total number of cars.
Let's say the total number of cars in the used car lot is represented by "x." According to the given information:
Fraction of cars that are gray = 2/5
Fraction of cars that are electric = 1/3
To find the number of gray cars, we multiply the fraction by the total number of cars:
Number_of_gray_cars = (2/5) * x
To find the number of electric cars, we also multiply the fraction by the total number of cars:
Number_of_electric_cars = (1/3) * x
Therefore, the specific values for the number of gray and electric cars in the used car lot cannot be determined without knowing the total number of cars (represented by "x").