Help with AMC past paper question (1 Viewer)

Constantspy977 · Oct 12, 2021

Im not entire sure how to approach this question, could anyone give working out so I can understand, thank you in advance

Screen Shot 2021-10-12 at 10.42.42 am.png

CM_Tutor · Oct 12, 2021

It is saying that every integer can be expressed in the form $kB + R$ where $k$ is zero or a positive integer, $B$ is a chosen integer base (we work with $B=10$ all the time), and $R$ is the remainder, which is an integer between 0 and $B - 1$ . Illustrating with 100:

$\text{Base 15:} \qquad 100 = 6 \times 15 + 10$

$\text{Base 27:} \qquad 100 = 3 \times 27 + 19$

You are seeking integers which can be expressed as $15k + R$ or as $27m + R$ where $k$ and $m$ are zero or positive integers, where $R$ is an integer satisfying $0 \leqslant R \leqslant 14$ , and where $15k + R = 27m + R$ .

Constantspy977 · Oct 12, 2021

CM_Tutor said:
It is saying that every integer can be expressed in the form $kB + R$ where $k$ is zero or a positive integer, $B$ is a chosen integer base (we work with $B=10$ all the time), and $R$ is the remainder, which is an integer between 0 and $B - 1$ . Illustrating with 100:

$\text{Base 15:} \qquad 100 = 6 \times 15 + 10$

$\text{Base 27:} \qquad 100 = 3 \times 27 + 19$

You are seeking integers which can be expressed as $15k + R$ or as $27m + R$ where $k$ and $m$ are zero or positive integers, where $R$ is an integer satisfying $0 \leqslant R \leqslant 14$ , and where $15k + R = 27m + R$ .

how would you find out how many integers satisfy the equation though? surely its not trial and error

username_2 · Oct 12, 2021

Constantspy977 said:
how would you find out how many integers satisfy the equation though? surely its not trial and error

From here it is simple enough. As k and m must be integers,
All factors of 15 until 100:
15, 30, 45, 60, 75, 90
All factors of 27:
27, 54, 81

Hence, the number of possible combinations that satisfy the equations are 6*3 = 18 (i think at least)

Constantspy977 · Oct 12, 2021

username_2 said:
From here it is simple enough. As k and m must be integers,
All factors of 15 until 100:
15, 30, 45, 60, 75, 90
All factors of 27:
27, 54, 81

Hence, the number of possible combinations that satisfy the equations are 6*3 = 18 (i think at least)

but aren't the factors supposed to go a 1000 because that's what it says in the question

username_2 · Oct 12, 2021

Constantspy977 said:
but aren't the factors supposed to go a 1000 because that's what it says in the question

Oh a 1000 - yep misread the question.

Constantspy977 · Oct 12, 2021

For anyone who doesn't know how to do it, I figured it out.
Answer: 30
Why?
Well, you gotta find the lowest common multiple first, which is 15x27, you get 405 and from here to go until 419 because you can only go 14 integers as stated when divided by 15. So you get 405,406,407,408,409,410,411,412,413,414,415,416,417,418,419. Now since you know 405 is a common factor, double it so you know for certain that the doubled number is also a common factor. When you double it, you get 810 and again you only go 14 integers. So 810,811,812,813,814,815,816,817,818,819,820,821,822,823,824. Then you count those numbers and get 30.

Hope this helped

CM_Tutor · Oct 13, 2021

Constantspy977 said:
For anyone who doesn't know how to do it, I figured it out.
Answer: 30
Why?
Well, you gotta find the lowest common multiple first, which is 15x27, you get 405 and from here to go until 419 because you can only go 14 integers as stated when divided by 15. So you get 405,406,407,408,409,410,411,412,413,414,415,416,417,418,419. Now since you know 405 is a common factor, double it so you know for certain that the doubled number is also a common factor. When you double it, you get 810 and again you only go 14 integers. So 810,811,812,813,814,815,816,817,818,819,820,821,822,823,824. Then you count those numbers and get 30.

Hope this helped

But, 136 = 9 x 15 + 1 = 5 x 27 + 1.

So, 136 is one of the solutions.

Constantspy977 · Oct 13, 2021

CM_Tutor said:
But, 136 = 9 x 15 + 1 = 5 x 27 + 1.

So, 136 is one of the solutions.

Oh true, that does make sense, well do you know the best way to figure it out?

CM_Tutor · Oct 13, 2021

You are on the right track, but

$\begin{align*} 15k + R &= 27m + R \\ 15k &= 27m \\ 5k &= 9m \end{align*}$

You need to look at cases of integers where $m$ is divisible by 5 and $k$ is divisible by 9. The smallest possible $k$ is then 9, making $15k = 135$ . You have described above the cases $k = 27$ and $k = 54$ , but actually $k$ can be any integer multiple of 9.

Our solution is that $k \in \{9, 18, 27, ..., 63\}$ and for each value of $k$ , we have 15 possible values of $R \in \{0, 1, 2, ..., 14\}$ .

The last possible value is when $k = 63$ and $R = 14$ , that is,

$15 \times 63 + 14 \qquad = \qquad 959 \qquad = \qquad 27 \times 35 + 14$

as the next result would be at $15 \times 72 + 0 = 1080 > 1000$ .

The solutions come in groups of 15, as you noted, and we now know the starting condition, so up to 1000 we have $15 \times 9 = 135$ , by my count... unless I've missed something.

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