Final answer:
Natasha could have 9 red apples and 4 green apples, or 10 red apples and 3 green apples.
Step-by-step explanation:
To determine the number of red and green apples Natasha could have, we need to consider the given information. Natasha has a total of 13 apples, and she has more red apples than green apples.
Let's assume that Natasha has r red apples and g green apples. We know that r + g = 13, since she has a total of 13 apples.
Given that she has more red apples than green apples, we can say that r > g.
Now, we need to find the possible values of r and g that satisfy these conditions. We can use trial and error to find the values that work:
- If r = 9 and g = 4, then the statement r > g is true and r + g = 13 is also true. Therefore, Natasha could have 9 red apples and 4 green apples.
- If r = 10 and g = 3, then the statement r > g is true and r + g = 13 is also true. Therefore, Natasha could have 10 red apples and 3 green apples.
- If r = 11 and g = 2, then the statement r > g is true, but r + g = 13 is not true. Therefore, Natasha cannot have 11 red apples and 2 green apples.
Based on our analysis, Natasha could have either 9 red apples and 4 green apples, or 10 red apples and 3 green apples.