How are exponents and powers different? (DON'T GOOGLE IT!)
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Answer 1
Answer:
Answer:
The power is larger than the exponet
Step-by-step explanation:
Answer 2
Answer:
A power is the product of multiplying a number by itself. A power is represented with a base number and an exponent. The base number tells what number is being multiplied. The exponent, a small number written above and to the right of the base number, tells how many times the base number is being multiplied.
PLEASE ANSWER IN LESS THAN 10 MINUTES!!!!!!!!!!! Multiply.
3.56 • –14
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if do the math as is shown to you will get -49.84 that I will show you its right @TTSSPony2002 so you do the math like this 3.56*-14= -49.84
-8x/5+1/6=-5x/3 I don't get how to find the answer?
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In order to find this answer we have to manipulate the equation algebraically so that we end up with a statement that x = something. We can manipulate the problem however we need to as long as we do the same thing to both sides of the equation (this keeps the equation true).
-8x/5 + 1/6 = -5x/3
first lets get the x's on one side of the equals sign by adding 8x/5 to each side.
1/6 = -5x/3 + 8x/5
Ok, now let's add the x's together (we need common denominators)
1/6 = -25x/15 + 24x/15 1/6 = -x/15
Now lets get x by itself by multiplying each side by 15
1/6 * 15 = -x 15/6 = -x 3/2 = -x
Multiply each side by -1 to make the x positive.
-3/2 = x
What is the word and expanded form of 2.789
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2.789 = numerical form
Expanded from = 2 + .7 + .08 + .009
Word form:- two and seven hundred eighty-nine thousandths
Please solve this word problem fast!!
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The answer would be around 168. Because 21 cars pass in 15 minutes, there are 4 15 minutes in an hour. 21x4 is 84. So 84 cars pass in an hour. But since its 2 hours you need to multiply 84 by 2. Which gets you the final answer of 168
What is the length of the longest side of a triangle that has the vertices (-5, 6), (-5, -2), and (1, -2)? Round to the nearest hundredth, if necessary
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Well you'd use the distance formula for each pair of points:
d = sq.root of((x2 - x1)^2 + (y2-y1)^2)
(1) For the points (-5,6) and (-5,-2):
d = sq.root of((-5-(-5))^2 + (-2-6)^2) = sq.root of (0 + 64) = 8
(2) For the points (-5,-2) and (1,-2):
d = sq.root of((1-(-5))^2 + (-2-(-2))^2) = sq.root of (36 + 0) = 6