SOLUTION: If the digits of a two-digit positive interger are reversed, the result is 6 less than twice the original numder. Find all such intergers for which this is true. How do you figu

Algebra ->  Graphs -> SOLUTION: If the digits of a two-digit positive interger are reversed, the result is 6 less than twice the original numder. Find all such intergers for which this is true. How do you figu      Log On


   

Question 175629This question is from textbook Algebra 1
: If the digits of a two-digit positive interger are reversed, the result is 6 less than twice the original numder. Find all such intergers for which this is true.
How do you figure this out? This question is from textbook Algebra 1

Found 4 solutions by ankor@dixie-net.com, Mathtut, josmiceli, solver91311:
Answer by ankor@dixie-net.com(22740) About Me  (Show Source):
You can put this solution on YOUR website!
If the digits of a two-digit positive integer are reversed, the result is 6 less than twice the original number. Find all such integers for which this is true.
:
Let x = the 10's digit
Let y = the units digit
then
10x + y = original integer
and
10y + x = reversed digit number
:
Write an equation for what it says:
10y + x = 2(10x + y) - 6
:
10y + x = 20x + 2y - 6
:
10y - 2y = 20x - x - 6
:
8y = 19x - 6
y = %2819x-6%29%2F8
You can see there are not many values for x which will result in a single digit integer for y.
:
x=1 obviously not (13/8)
x=2
y = %2819%2A2%29-6%29%2F8
y = %2838-6%29%2F8
y = 32/8
y = 4
Our original number = 24, and you will find that this is the only one.

Answer by Mathtut(3670) About Me  (Show Source):
You can put this solution on YOUR website!
lets call our digits a and b written as ab
:
now remember ab can also be written as 10a+b
and when it is reverse it is ba which can be written as 10b+a
:
so with that info lets write the equation: they only gave us enough info for one equation so we are going to have to do some surmising on this one:
:
10b+a=2(10a+b)-6
:
10b+a=20a+2b-6
:
8b-19a=-6
:
the only possibilities for this scenario is digits 0-9 for both a and b. the question is can we find an integer value for both a and b that satisfies this equation.
the value of 19a always has to be more that the value of 8b in order to get -6
:
so for a=1 b can only be 1 or 2 (8-19),(16-19)...neither of which works
a=2 so 19a=38.. so we need 8b=32...8(4)=32 so we have a pair a=2 b=4.
a=3 so 19a=57...so we need 8b=51....no integer value will work
a=4 so 19a=76...so we need 8b=70....no integer value will work
a=5 so 19a=95...so we need 8b=89---> we have exhaused our possibilities here. as you can see in order for 8b=89 we would have to multiply by two digit number and as the value of 19a gets higher the same will hold true
:
so we have found the only integers for which this is true and
:
they aresystem%28a=2%2Cb=4%2Cab=24%29

Answer by josmiceli(19441) About Me  (Show Source):
You can put this solution on YOUR website!
Here's how to find the value of a number if
you are given the digits:
Let the 10s digit = m
Let the 1s digit = n
The value of the number is 10m+%2B+n
Given:
10n+%2B+m+=+2%2A%2810m+%2B+n%29+-+6
10n+%2B+m+=+20m+%2B+2n+-+6
19m+-+6+=+8n
The key to going on from here is to realize
that m and n are single digits
and can only be 0 - 9.
m can't be 0, you can't start a 2-digit
number with 0. I'll find m and
solve for n
19m+-+6+=+8n
----------
m -- n
1 -- 13/8 not a digit
2 -- 4
3 -- 51/8 not a digit
4 -- 35/4 not a digit
5 -- 89/8 not a digit
6 -- 27/2 not a digit
7 -- 127/8 not a digit
8 -- 73/4 not a digit
9 -- 165/8 not a digit
The only number found is 24
check:
10n+%2B+m+=+2%2A%2810m+%2B+n%29+-+6
10%2A4+%2B+2+=+2%2A%2810%2A2+%2B+4%29+-+6
42+=+2%2A24+-+6
42+=+42
OK

Answer by solver91311(24713) About Me  (Show Source):
You can put this solution on YOUR website!
Let the tens digit be represented by d%5Bt%5D and the ones digit be represented by d%5Bo%5D. That means you can represent any two digit positive number by 10d%5Bt%5D+%2B+d%5Bo%5D if you restrict d%5Bt%5D and d%5Bo%5D to the set {0, 1, 2, 3, 4, 5, 6, 7, 8, 9}.

If our original number is 10d%5Bt%5D+%2B+d%5Bo%5D then the number with reversed digits is 10d%5Bo%5D+%2B+d%5Bt%5D. Then the conditions of the problem give us:

2%2810d%5Bt%5D+%2B+d%5Bo%5D%29+-+6+=+10d%5Bo%5D+%2B+d%5Bt%5D

Simplify and solve for d%5Bt%5D

20d%5Bt%5D+%2B+2d%5Bo%5D+-+6+=+10d%5Bo%5D+%2B+d%5Bt%5D

19d%5Bt%5D+=+8d%5Bo%5D+%2B+6

d%5Bt%5D+=+%288d%5Bo%5D+%2B+6%29%2F19

Now remember that both d%5Bt%5D and d%5Bo%5D are restricted to the set {0, 1, 2, 3, 4, 5, 6, 7, 8, 9}. That means that we have to find which of the given set of numbers, when substituted for d%5Bo%5D, yield d%5Bt%5D also an element of the given set. We know that since the denominator is 19 and there are only ten consecutive integer possibilities, we have at most 1 solution.

We can also see that 8d%5Bo%5D+%2B+6 must be an integer multiple of 19.

The first five integer multiples of 19 are 19, 38, 57, 76, and 95. So:

8d%5Bo%5D+%2B+6+=+198d%5Bo%5D+=+12d%5Bo%5D not an integer.

8d%5Bo%5D+%2B+6+=+388d%5Bo%5D+=+32red%28d%5Bo%5D+=+4%29 IS an integer. This is our solution, but let's continue just to make sure.

8d%5Bo%5D+%2B+6+=+578d%5Bo%5D+=+51d%5Bo%5D not an integer.

8d%5Bo%5D+%2B+6+=+768d%5Bo%5D+=+70d%5Bo%5D not an integer.

8d%5Bo%5D+%2B+6+=+958d%5Bo%5D+=+89d%5Bo%5D not an integer AND d%5Bo%5D+%3E+9 so we can stop looking.

Now we know the ones digit is 4, so using d%5Bt%5D+=+%288%284%29+%2B+6%29%2F19+=+38%2F19+=+2 we know the tens digit is 2.

The only positive two-digit integer that satisfies the given conditions is 24.

Check the answer:

2 times 24 is 48 which is 6 more than 42 which is 24 with the digits reversed. Checks.

By the way, the word is integer, not interger.