) Consider the relation R on the positive integers defined by the following recursive definition: • (1, 1) ∈ R. • If (x, y) ∈ R, then (x, y + x) ∈ R and (y, y) ∈ R. 1(a). (10 pts.) Is R an equivalence relation? Either prove R is an equivalence relation or explain why it is not. 1(b). (5 pts.) Is R transitive? Justify your answer

the answer to this question is 3/19

step-by-step explanation:

  or  

step-by-step explanation:

if the four friends split the cost, p, of the pizza evenly, then each friend pays one-fourth of the cost of the pizza.

the expression is   or  

step-by-step explanation:

divide, then simplify your answer.

1. make -15.66 ÷   5.8 a fraction. then divide.

2. simplify.  

3. final answer.  

lol.

it's ok we all do this sometimes.

-aparri