Scale drawing problems are solved using?
Oh, dude, the ratio between two sets of measurements is just a way to compare the sizes of things. It's like looking at how many times one thing fits into another. So, if you have, like, 5 apples and 2 oranges, the ratio of apples to oranges would be 5:2. It's just a fancy math term for saying "this many of this, that many of that."
The ratio is the same as the ratio between the number of teeth.
Cross Products
an example of a ratio is the difference between two numbers or sets of numbers such as 600 and 200... the ratio is 400...
If both sets are in agreement, it is a good indication each is accurate. If, on the other hand, there is great disparity between the two sets, we may conclude there is some significant error in our data gathering or sampling technique. The NASA GISS data (see link) include both a land/sea temperature index and temperature measurements from meteorological stations.
Could be the conversion factor - but only if the two sets of measurements are on scales that are linear AND absolute.
Oh, dude, the ratio between two sets of measurements is just a way to compare the sizes of things. It's like looking at how many times one thing fits into another. So, if you have, like, 5 apples and 2 oranges, the ratio of apples to oranges would be 5:2. It's just a fancy math term for saying "this many of this, that many of that."
The ratio is the same as the ratio between the number of teeth.
Cross Products
It is simply the first measurement divided by the second, expressed with their measurement units as a ratio.
an example of a ratio is the difference between two numbers or sets of numbers such as 600 and 200... the ratio is 400...
The ratio is 1 : 3.
Math
A ship sets a course between ports.
Correlation
Which of these sets of measurements shows the greatest precision?
a bar graph