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When integrating, are you finding.. (1 Viewer)
- Thread starter sinophile
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MC Squidge
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an amount
sinophile
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So, a number or an area, which is a scalar quantity?
samthebear
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i thought it was either depending on the question =/
Dumbledore
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a number, this concept is usually asked in a question like
"explain why integral(0, 2) x^2-1 dx will not find the area of this curve bounded by the x axis
"explain why integral(0, 2) x^2-1 dx will not find the area of this curve bounded by the x axis
hermand
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when asked to integrate, ie 
you will get zero as an answer, because the negative area [below the x axis] will cancel out the positive area [above the axis], because when you are asked to integrate, you can get negative numbers,
but when asked to find the area, you must absolute value everything because you can't have a negative area.
you will get zero as an answer, because the negative area [below the x axis] will cancel out the positive area [above the axis], because when you are asked to integrate, you can get negative numbers,
but when asked to find the area, you must absolute value everything because you can't have a negative area.
kwabon
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an area cannot be negative ... so hence ... u are finding an amount.
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When you find a DEFINITE INTEGRAL:
\,dx)
...you are finding the summation of infinitely small partitions (think of them as tiny rectangle approximations) of a region bounded by the curve y = f(x), x = a and x = b (assuming the integral and function is well defined across that x interval). Each partition has an infinitely small width dx and length f(x). Hence when f(x) is negative then f(x) dx is negative, hence it contributes negatively to the integral summation.
...you are finding the summation of infinitely small partitions (think of them as tiny rectangle approximations) of a region bounded by the curve y = f(x), x = a and x = b (assuming the integral and function is well defined across that x interval). Each partition has an infinitely small width dx and length f(x). Hence when f(x) is negative then f(x) dx is negative, hence it contributes negatively to the integral summation.
Gibbatron
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The area below a curve has to be positive because it is an area. If you are asked to find an area between two points, and the line cuts the x axis somewhere in betwen these two points, you will need to integrate twice, once for the area under the x axis and once for above, find the modulus of both areas and add them. It is impossible to get a negative area.