Looking back at some of my earlier attempts at this, I found that I came up with these equations early. I found also that I was unable to answer this because of the lack of understanding how to manipulate the terms to arrive at a statement that I understood. I am not looking for someone to...
"No he means that there are two separate statements and you have no reason to combine them, so why are you?"
If they have the same variables...how can you not?
Ok...like most of the other students in my class...I have know idea of what you are talking about. Are you saying to write it like this-
(x+y)^2+x+y=48
my major problem in understanding this is understanding the terminology.
"The sum of two numbers is 8"
"The sum of these numbers squared is 40"
"What are the numbers?"
Is the inital equation that I came up with right/wrong?
(x^2+y^2)+(x+y)=(40+8)
OK...I don't know why I did this. I'm afraid I do this too often.
I just took a test in Pre-Algerbra. I remember a question that went like this.
"The sum of two numbers is 8"
"The sum of these numbers squared is 40"
"What are the numbers?"
Is the inital equation that I came up with right/wrong?
[tex](x^2+y^2)+(x+y)=(40+8)[\tex]