Y=A(0.025k-0.5N)N ,A=2/3, K= 2000, C=200+(2/3)(Y-T)-300r, T= -75+1/4Y, I=100-100r, G=100 L= 0.5Y--200i, M=6300, π=0.10
Add all relevant identities and equilibrium condition to complete the model.
Answers
Answer:
A basket contains 5 white and 8 red flowers. Two drawing of three flowers are made. Find the probability that the first drawing will give 3 white and the second drawing with 3 red flowers. (i) the flowers are replaced before the second trial and (ii) the flowers are not replaced before the second trial.
Explanation:
A basket contains 5 white and 8 red flowers. Two drawing of three flowers are made. Find the probability that the first drawing will give 3 white and the second drawing with 3 red flowers. (i) the flowers are replaced before the second trial and (ii) the flowers are not replaced before the second trial.
A basket contains 5 white and 8 red flowers. Two drawing of three flowers are made. Find the probability that the first drawing will give 3 white and the second drawing with 3 red flowers. (i) the flowers are replaced before the second trial and (ii) the flowers are not replaced before the second trial.
A basket contains 5 white and 8 red flowers. Two drawing of three flowers are made. Find the probability that the first drawing will give 3 white and the second drawing with 3 red flowers. (i) the flowers are replaced before the second trial and (ii) the flowers are not replaced before the second trial. A basket contains 5 white and 8 red flowers. Two drawing of three flowers are made. Find the probability that the first drawing will give 3 white and the second drawing with 3 red flowers. (i) the flowers are replaced before the second trial and (ii) the flowers are not replaced before the second trial.
Answer:
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