your weight on the moon is about 1/6 of your weight on earth write and solve an equation to show how much a person weighs on earth if he weighs 16 pounds on the moon.how could you check that your answer is reasonable
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If one sixth of your weight is 16, multiply it by 6.
16 x 6 = 96.
Final answer:
To find a person's weight on earth when you know their weight on the moon, multiply the moon weight by 6 (since weight on the moon is 1/6 of weight on earth). Therefore, if a person weighs 16 pounds on the moon, they would weigh 96 pounds on earth.
Explanation:
The question asks how much a person weighs on earth if he weighs 16 pounds on the moon. The fact that a person weighs about 1/6 on the moon than on earth would indicate that weight on earth is larger. In this case, you can find the earth weight by multiplying the moon weight to 6 (since it is 1/6). So, using this formula, if a person weighs 16 pounds on the moon, he would weigh 16 * 6 = 96 pounds on earth.
To check if this is reasonable, if you have the earth weight, you can divide by 6 to see if you return to the original moon weight. In this case, 96 / 6 = 16, which is the given moon weight, so the answer seems reasonable.
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For the quadratic trinomial the following formula
, where
are trinomial roots, holds.
1. For trinomial find the roots:
.
2. The factoring form is
Answer: correct option is B.
multiply first terms and multiply last terms and add and see if we get the middle term
example
(x+2)(2x-3)=2x^2+x-6x
2*2x+x*-3=4x-3x=x=middle term so
a. (2x+5)(3x-1)
2x*-1+5*3x=-2x+15x=13x, no we want -13x
b. (2x-5)(3x+1)
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32 x 43
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Jim must get ≥ 78 score to maintain his average ≥ 90 .
What is an average ?
Every thing has a central tendency , Average is one of the measure of Central Tendency.
It is the mean of all the given numbers and is determined by summing all the numbers or data and then dividing by the total number of data.
It is given that
Jim has gotten scores of 99 and 93 on his first two tests.
He has to maintain an average of 90 or greater
The third test score = ?
Average = (99+93+x)/3
90≤ (99+93+x)/3
270 ≤ (99+93+x)
270 ≤ 192 + x
Therefore x ≥ 78
Jim must get ≥ 78 score to maintain his average ≥ 90 .
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(99 + 93 + x) / 3 = 90
or 192 + x = 270
or x = 270 - 192 = 78
Jim must score at least 78 in the third test.
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Answer:
Use the slope-intercept form to find the slope and y-intercept.
Slope: −1 y-intercept: (0,−5)
Step-by-step explanation:
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