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Integration - Inequalities (1 Viewer)
- Thread starter Premus
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(a)
Draw the graph and think of the integral as the area under the curve.
Let's recall the formula for the area of a rectangle (just do it... you'll see why later).
Area = width * height.
The width is 1 (one) because it's the area between n and n+1.
So, numerically (I mean, without considering the units),
Area = height
Now, let height = 1/x (x-coord at a particular point)
Now if the height is 1 / (n+1) then the rectangle is smaller than the area under the curve (can you visualise it? you should draw the curve if you haven't).. if the height is 1/n the rectangle is bigger...
(b)
I've been thinking about this but my thinking doesn't seem to show any progress... sorry..
Draw the graph and think of the integral as the area under the curve.
Let's recall the formula for the area of a rectangle (just do it... you'll see why later).
Area = width * height.
The width is 1 (one) because it's the area between n and n+1.
So, numerically (I mean, without considering the units),
Area = height
Now, let height = 1/x (x-coord at a particular point)
Now if the height is 1 / (n+1) then the rectangle is smaller than the area under the curve (can you visualise it? you should draw the curve if you haven't).. if the height is 1/n the rectangle is bigger...
(b)
I've been thinking about this but my thinking doesn't seem to show any progress... sorry..
Note that we have ∫ (n --> n+1) 1 / x dx = [ln|x|] (n --> n+1) = ln(n + 1) - ln n = ln[(n + 1) / n] = ln(1 + 1 / n), noting that n > 0
So, our inequality is actually:
Taking MHS < RHS, we have
This is LHS < MHS of our goal inequality. If you use LHS < MHS of the original inequality, you should be able to find the other part of the desired result.
So, our inequality is actually:
1 / (n + 1) < ln(1 + 1 / n) < 1 / n
Taking MHS < RHS, we have
ln(1 + 1 / n) < 1 / n
On multiplication by n, we get n * ln(1 + 1 / n) < 1
and on using log laws, this becomes ln[(1 + 1 / n)<sup>n</sup>] < 1
Converting to exponential form, we get (1 + 1 / n)<sup>n</sup> < e<sup>1</sup> = e
This is LHS < MHS of our goal inequality. If you use LHS < MHS of the original inequality, you should be able to find the other part of the desired result.