What is a simple formula to find 2 intermediate values between 2 known values?
f(1)=a, f(2)=?, f(3)=?, f(4)=b
If there would be only 1 unknown, then it would be mean ((a+b)/2), but what to do when there are 2 intermediate values to calculate?
What is a simple formula to find 2 intermediate values between 2 known values?
f(1)=a, f(2)=?, f(3)=?, f(4)=b
If there would be only 1 unknown, then it would be mean ((a+b)/2), but what to do when there are 2 intermediate values to calculate?
Define
$f (x) := a + \left(\frac{b-a}{3}\right) (x-1)$
and then evaluate $f (2)$ and $f (3)$. You should obtain
$f (2) = \frac{2 a + b}{3}, \quad{} f (3) = \frac{a + 2 b}{3}$
which are weighted averages of $a$ and $b$. If you had $4$ known values, you would be able to use a cubic interpolating polynomial, but since you only have $2$, you must use an affine polynomial.
The four numbers are:
$a=\frac{3a+0}3, \frac{2a+b}3, \frac{a+2b}3, \frac{0+3b}3=b$