pizza store has small/medium/large with 10 different toppings 2 crusts and 3 types of sauses. how many ways to ordera pizza with atleast 1 topping and 1 sauce?
When I solved the answer, I find that B has the highest probability of winning, can anyone verify this.
Also once on person is dead they shoot each other
Three women A,b,c are involved in a contest with the following rules. A shoots B, if B survives, B shoots C and if C survives, C shoots A. A is 25% accurate, B is 45% and C is 75%. Who is most likely to win if the women continue to shoot in order and in turn. (Who is most likely to be alive)
um... b1 is a real number but I don't know how to get it. Do you know of anywhere on the net where I can read up on these stuff ? I can't seem to find anything in my textbook
they say to approximate using (i believe) this equation
V_k = b_1 * lamba^k * X
where lambda is the eigen value of A and X the eigen vector of A (I am presuming)
sorry my last post was wrong I edited it. OK I will restate the question:
there is a linearly dynamical system V_k+1 = AV_k
I have the values of A and V_0
The have asked me to approximate the value of V_k.
That's the question. I just don't understand how to do it
sorry :) I believe in this equation, lamba is the eigen value, X_1 is the eigen vector and I don't know what b1 is.
The question is I have been given the linear dynamical system V_k+1 = AV_k and they have given values for A and V_0 and I have to approximate V_k
yes I know this, but I don't know how to find the eigen value of that paticular matrix (A can be any matrix). The actual question is that I have to prove that lambda is an eigen value of A only if (lamda - alpha) is an eigen value of C