Scott was denied his freedom.
The Court ruled that slavery was legal in every state of the Union.
The ruling divided the two sections more than ever.
Yes, she has 3 sons. Her husband is Scott Holt
Coretta Scott king and martin Luther king had 4 children,jasmine,James,kiesha and natalia
About 3 cents if circulated and about a dollar or so if uncirculated. They are fairly common coins, even if not seen in pocket change very often.
$2 unless in absolutely uncirculated condition in which case it might be worth $3.
Expanding brackets in math is simply multiplying all expressions inside the bracket with the variable or coefficient outside. For example: 3x(5 + 3y) = 2 To expand the brackets, simply multiply 3x with each of the expressions inside, always keeping in mind the sign of the answer (negative/positive) Step 1: (3x * 5) + (3x * 3y) = 2 Step 2: 15x + 9xy = 2 Here is another example in which the signs change from negative to positive: -3 (-2x + 4) = 1 Since you multiply -3 with -2x, you are multiplying a negative value with a negative value. Minus ( - ) and minus (-) multiply to give a positive value. Step 1: (-3x * -2x) + (-3x * 4) = 1 Step 2: 6x - 12x = 1 You will notice that, in time, as you continue to practice with these types of questions, you will not be needing Step 1 and be able to skip to Step 2. Another example, in the case where you have brackets^squared 3(2x + 5)^2 = 4 In this case, you cannot directly multiply 3 with the expressions in the bracket since they are being squared and must be evaluated first. In the case where you have a polynomial which is being squared, you must expand it first using the rule: Note: ^2 means squared (Just like 5^2 = 25) (a + b)^2 = a^2 + 2ab + b^2 [Where a and b may be any value which cannot be solved directly using arithmetic] So in the case above you use this rule. 2x is 'a' and '5' is b. 3(2x + 5)^2 = 4 3(4x^2 + 2(2x)(5) + (5)^2) = 4 3(4x^2 + 20x + 25) = 4 At this point, you may multiply the brackets, since the term inside has been fully expanded. (3 * 4x^2) + (3 * 20x) + (3 * 25) = 4 12x^2 + 60x + 75 = 4 You have successfully expanded the brackets at this point =D. In the case where you have two brackets: (a + b)(b + c) = 3 You must multiply each term in bracket #2 with each term in bracket #1. Start with multiplying a with b and c, then b with b and c. (a*b) + (a*c) + (b*b) + (b*c) = 3 ab + ab + bb + bc = 3 Hope this helps...
what are 3 outcomes as a result of Reconstruction
Each toss has 2 outcomes; so the number of outcomes for 3 tosses is 2*2*2 = 8
The outcome that is the top number on a fraction. e.g. The multiples of 3 are 3 and 6 = there are 2 favourable outcomes. Probability ( multiple of 3 ) + 2/6 = two favourable outcomes/six possible outcomes
2x2x2=8 possible outcomes. In general for n tosses there are 2^n outcomes.
6 outcomes each roll, 3 rolls. 6*6*6 = 216.
3
Number of useful outcomes over number of possible outcomes and simplify it if you can. Imagine you want an even number and you roll a die. There are 6 possible outcomes and three of them are useful outcomes (outcomes we want). 3 6 Simplify it and you get 1 2
23 or 8 outcomes. In any experiment with two outcomes, if you do the experiment n times there are 2n outcomes. This about each time you roll the coin have two possible outcomes, H or T. So if you roll it 2 times, you have 4 possible outcomes. HH, HT, TH or TT. Do it one more time and you have 8 outcomes. HHH, HHT, HTH, THH TTT TTH THT HTT Notice there are 1 outcome with 3 heads, 1 with 3 tails 3 with two heads 3 with two tails This pattern follow the binomial theorem. The coefficients of the binomial (H+T)3 are 1 3 3 1. The same numbers as we have above!
The outcomes are: heads, tails, tails or tails, heads, tails or tails, tails, heads. You can see that there are 3 possible outcomes with exactly 1 head.
Probability = (number of successful outcomes) / (number of possible outcomes)Possible outcomes: 6Successful outcomes: 1Probability = 1/6 = 16 and 2/3 percent.
Dred Scott was an African-American slave who unsuccessfully sued for his family's freedom. The three questions involved in the Dred Scott case are: 1. Can a slave who has been transported to a "free state" become free? 2. Can a slave sue in Federal Court? 3. Is a slave a citizen of the United States?
At least three.