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Answer: 13


Using algebra to compare the letters
  
I + R + 6 = I + C + 10

$\therefore$ R + 6 = C + 10

$\therefore$ R is 4 more than C

But that is only possible if R = 13 (and C = 9)




Using reasoning
1 + 3 + 5 + 7 + 9 + 10 + 11 + 12 + 13 = 75
Each number is on 2 lines so the lines add up to 75$\times$2 = 150
Five lines $\therefore$ 30 per line.
 
1 + R + I + 5 = 30 $\Rightarrow$ R + I = 24

R and I are 11 and 13





If R = 11:
   Can't have 11 twice

If R = 13:
       So R = 13
 

Alternatively, using algebra and equating the sum of each line
We are told that the sum of each line is equal. Therefore $1+R+I+5, 4+N+R+3, 7+H+N+1, 5+C+H+4$ and $3+I+C+7$ are all equal.

Combining the equations with a common term in turn gives:

$1+R+I+5=4+N+R+3⇒6+I=7+N⇒I=N+1$
$4+N+R+3=7+H+N+1⇒7+R=8+H⇒R=H+1$
$7+H+N+1=5+C+H+4⇒8+N=9+C⇒N=C+1$
$5+C+H+4=3+I+C+7⇒9+H=10+I⇒H=I+1$
$1+R+I+5=3+I+C+7⇒6+R=10+C⇒R=C+4$

The last of these equations is a good check to make sure that the results of the others work.

This means that, in increasing order, adding one each time, the numbers are $C$, $N$, $I$, $H$, $R$.

Therefore, $R$ is the largest number, so $R=13$ (and $H=12, I=11, N=10$ and $C=9$, which is $4$ less that $R$ so is correct).

 

This problem is taken from the UKMT Mathematical Challenges.
You can find more short problems, arranged by curriculum topic, in our short problems collection.