I can see many examples related to EXPECTATION-MAXIMIZATION algorithm.

Few links are

Expectation Maximization coin toss examples

https://math.stackexchange.com/questions/81004/how-does-expectation-maximization-work-in-coin-flipping-problem

https://math.stackexchange.com/questions/25111/how-does-expectation-maximization-work

http://www.nature.com/nbt/journal/v26/n8/full/nbt1406.html?pagewanted=all

In all cases, we have set of hidden sources (typically coins ).. and set of observations ( typically set of coin tossing).

For example

SRC = { Coin-1, Coin-2 }

OBSERVATIONS ARE

{ HTH, SRC1 },

{ THH, SRC2 },

{ HHH, SRC3 },

{ HTH, SRC4 },

{ HTT, SRC5 }

here we pick a coin(unobserved,SRC1) and toss three times(observed, HTH).

My Question is , If I make a observation as a single coin toss,like

{ H, SRC1 },

{ T, SRC2 },

{ H, SRC3 },

{ H, SRC4 },

{ H, SRC5 }

Will EM work for this case ?

If so, What will be result ?