You didn't clearly say why the result is disappointing, so I'm assuming it means the color transition you get is not as good you expected it to be.

Your general approach seems right, maybe you are just missing some detail so I will rewrite it in different terms. Let `color1`

and `color2`

be triples (R, G, B) where each of R, G, B is in range [0, 1]. If that is not the case, divide by 255 if that is the limit in your situation, and later multiply again by 255. Let `s`

be the number of steps to transition from `color1`

to `color2`

, here I'm including in `s`

the initial frame with `color1`

but not the final frame with `color2`

. At step `k`

, you have a value `p`

such that `p = (s - k)/s`

. With `p`

you obtain the color in frame `k`

by doing `color = p * color1 + (1 - p) * color2`

. Now you may want to multiply `color`

by 255.

A pseudocode for this description is:

```
color1 = (R1, G1, B1)
color2 = (R2, G2, B2)
s = N
for k = 0 to s: # s + 1 steps, according to the description
p = (s - k) / s
color = (p * color1) + ((1 - p) * color2)
```

Note that at `k = 0`

you have only `color1`

, and at `k = s`

you get only `color2`

. As you see, it is similar to what you posted with more details. Note that here I'm multiplying each of R, G, B by `p`

.

Here are some examples transitioning from a yellow to some blue color, `steps = 10, 25, 500`

respectively.