You are using an out of date browser. It may not display this or other websites correctly.
You should upgrade or use an alternative browser.
You should upgrade or use an alternative browser.
Consecutive Integers Help
- Thread starter RVCA123
- Start date
Hello, RVCA123!
Let \(\displaystyle x\) = smaller integer.
Let \(\displaystyle x\!+\!1\) = larger integer.
We have: .\(\displaystyle \underbrace{\text{half of smaller}}\:\underbrace{\text{is}}\;\underbrace{ \text {two more than}}\;\underbrace{\text{larger}}\)
. . . . . . . . . . . . \(\displaystyle \dfrac{1}{2}x\) . . . . \(\displaystyle =\) . . . . . \(\displaystyle 2\;+ \) . . . .. \(\displaystyle x+1\)
You're right, lookagain!
I overlooked the word "even" . . . *blush*
Find two consecutive even integers such that half of the smaller integer is two more than the larger integer.
Let \(\displaystyle x\) = smaller integer.
Let \(\displaystyle x\!+\!1\) = larger integer.
We have: .\(\displaystyle \underbrace{\text{half of smaller}}\:\underbrace{\text{is}}\;\underbrace{ \text {two more than}}\;\underbrace{\text{larger}}\)
. . . . . . . . . . . . \(\displaystyle \dfrac{1}{2}x\) . . . . \(\displaystyle =\) . . . . . \(\displaystyle 2\;+ \) . . . .. \(\displaystyle x+1\)
You're right, lookagain!
I overlooked the word "even" . . . *blush*
Last edited:
.find two consecutive > > > > even integers < < < < such that half of the smaller integer is two more than the larger integer.
How would this be set up? Solved?
soroban said:
let \(\displaystyle x\) = smaller integer.
Let \(\displaystyle x\!+\!1\) = larger integer.
No, soroban, they are consecutive even integers, not consecutive integers.
rvca123,
let x = the smaller integer
let x + 2 = the larger integer
The phrase "half of the smaller integer" would then mean \(\displaystyle \dfrac{1}{2}x. \)
The word "is" corresponds to the equals sign.
The phrase "two more than the larger integer" can mean "(x + 2) + 2." \(\displaystyle \ \ \ \)*
The equation can be:
\(\displaystyle \dfrac{1}{2}x \ = \ (x + 2) \ + \ 2, \ \ \ or \ \ \ \dfrac{1}{2}x \ = \ 2 \ + \ (x + 2)\)
* \(\displaystyle \ \ Or, \ \ you \ \ could \ \ also \ \ use \ \ \ 2 \ + \ (x + 2) \)
-----------> Continue and solve one of the above equations for x, and then add 2 to that result to get the other number.
Last edited: