It is fairly hard to make a colour bomb when you have 6 colours.
The chocolate and chocolate spawners on the top are hard to hit because no candies can fall 1 block under them, leaving 3 empty squares.
Breaking the chocolate on top will make it only a little bit better due to the candy cannons spilling liquorice swirl, although candies will spawn sometimes.
And even then the chocolate spawners can eventually cover the top again.
Overall, 2 colour bombs is not a lot and this can be finished in under 10 moves if you can make colour bombs early.
It is actually based on luck, you may pass it in fifty tries, or pass it in one try with only using 5 moves.
The order is worth 2,000 points.[1] Hence, an additional 8,000 points is required to earn one star.
Stars
Stars
Score
10,000
20,000
30,000
60,000
Strategy
Find a way to destroy the top 3 chocolate at first. Then try to avoid liquorice from flooding the board. If you see regular matches that kill liquorice, try to use it because you won't have to deal with more and it can increase your chances of finding the right candy.
If you know how to set up colour bombs and predict future moves, then you should succeed in this easily.
Don't give up. The more you play, eventually there will be a "friendly" board set up.
With booster
On mobile, the player does not lose a life when the player makes no moves. Just start with a colour bomb booster and start over and over til you can make another colour bomb in one move. That way you start with two colour bombs.
Trivia
This level can be completed in only 3 moves if you have a colour bomb booster and a match with a colour bomb.
Notes
Board Info
Orange line(s) show where the candies spawn.
Salmon line(s) show where the candy bombs spawn.
Red line(s) show where the candies and liquorice swirls spawn.
Elements Info
Element Spawn Notes
Elements
Notes
Spawn 1 every 2 moves.
If there are fewer than 18 liquorice swirls on screen, then the board spawns up to 18 when possible.
Miscellaneous Info
↑2 special candies × 1,000 points per special candy = 2,000 points