Answer:
just took test, confirming this other answer is right, good luck y'all
Step-by-step explanation:
There are 32,768 possible outcomes of 15 football matches.
The number of possibleoutcomes in 15 football matches can be calculated by multiplying the number of outcomes for each match.
Assuming there are only two possible outcomes for each match (win or lose), the number of possible outcomes for one match would be 2. Since there are 15 matches, we can use the formula 2^15 to calculate the total number of possible outcomes.
Using this formula, there are 32,768 possible outcomes of 15 football matches.
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To find the equation of a perpendicular line, you first need to find the negative reciprocal of the slope given. The slope is -1/3, so the slope of the perpendicular line will be 3
Now we just need to find the y intercept using the point (3, 2) and you can plug the coordinates in and then solve for b. Let's see what that looks like.
y=3x+b
2=3*(3)+b
2=9+b
-7=b So now we know the y-intercept and slope. We just put them together now
y=3x-7
A)8
B)12
C)16
D)18
Answer:
i think its A (edit: im gonna take that back because i was looking at the wrong side, logically it is 12)
Step-by-step explanation:
Answer:
B. 12
Step-by-step explanation:
logically speaking is 12
Answer:
√2 and √3
Good Luck!!!
A pair of irrational numbers whose sum is irrational does not practically exist. The sum of two irrational numbers can be either rational or irrational, and this solely depends on the numbers being added together.
The irrational numbers can be defined as any real number that is not a rational number. However, the sum of two irrational numbers is not always irrational. It could be rational or irrational depending on the numbers you're adding. However, you've asked for a case where the sum is also irrational. Let's consider two irrational numbers √2 and -√2. √2 is irrational. Likewise, -√2 is also irrational. However, when added (√2 - √2), they result in 0 which is not irrational. Therefore, it's near impossible to find two irrational numbers whose sum is also irrational.
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