Answer:
Step-by-step explanation:
From the equation 20b = 2.5, we can solve for b:
20b = 2.5b = 2.5/20b = 1/8
Therefore, b is rational.
a = √20 is irrational because 20 is not a perfect square.
c = 225 is a perfect square, specifically 15^2. Therefore, c is rational.
Now, we can evaluate a + b and b + c:
a + b = √20 + 1/8
Since a is irrational and b is rational, their sum (a + b) is irrational.b + c = 1/8 + 225
Since b and c are both rational, their sum (b + c) is rational.So, the reason why a + b is irrational but b + c is rational is because one of the terms in the sum is irrational in the former case and both terms are rational in the latter case.