(A) 10^(-8)
(B) 3*10^(-8)
(C) 3*10^(-4)
(D) 2*10^(-4)
(E) 10^(-4)
Both 0.99999999/1.0001 and 0.99999991/1.0003 look intimidating, but once you recognize the pattern a question like this can be handled relatively easily.
Let's take the analogy of difference of squares. where x^2 - y^2 = 0 becomes (x + y)(x - y) = 0 .
The question above is a situation in which we can use the idea of the difference of two squares to our advantage.
First, let’s first use this concept with a few easier whole numbers. For instance, let’s say we were asked:
999,999/1,001 – 9,991/103 = ?
We could rewrite this as:
(1,000,000 – 1)/1,001 – (10,000 – 9)/103
(1000 + 1)(1000 – 1)/1,001 – (100 – 3)(100 + 3)/103
(1,001)(999)/1,001 – (97)(103)/103
999 – 97 = 902
It might seem a roundabout way of doing things but on test day, when you're in a timed environment, you'll be completing the calculus quickly and accurately with difference of squares.
Let's use the same approach for the decimalized version.
0.99999999/1.0001 – 0.99999991/1.0003
[(1 – 0.00000001)/1.0001] – [(1 – 0.00000009)/1.0003]
[(1 – 0.0001)(1 + 0.0001)/1.0001] – [(1 – 0.0003)(1 + 0.0003)]
Try not to make any mistakes with the number of decimal places in our values. Since 0.00000001
has 8 decimal places, the decimals in the factors of the numerator of the first set of brackets must each have 4 decimal places (their square root of the factors of 10). Similarly, since 0.00000009 has 8 decimal places, the decimals in the factors of the numerator of the second set of brackets must each have 4 decimal places.
Going further:
[(1 – 0.0001)(1 + 0.0001)/1.0001] – [(1 – 0.0003)(1 + 0.0003)]
[(0.9999)(1.0001)/1.0001] – [(0.9997)(1.0003)/1.0003]
0.9999 – 0.9997
0.0002
Converting this to scientific notation:
2 x 10^-4
D
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