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CAT 2025 Lesson : Surds & Indices - Comparison of Surds

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1.2 Comparison of surds

To compare two surds and find out which one is greater/smaller,

(1) Subtract/add the same integer to both surds to make them comparable.
(2) Square the surds if the numbers are close after step 1.
(3) To compare square roots, find their integral ranges.

Example 2

a=2+8a = 2 + \sqrt{8}, b=4+3b = 4 + \sqrt{3} and c=52c = 5 - \sqrt{2}. Arrange aa, bb and cc in descending order.

Solution

We can compare two surds at a time.
a2=8a - 2 = \sqrt{8} and b2=2+3b - 2 = 2 + \sqrt{3}

2<8<32 < \sqrt{8} < 3 and 1<3<21 < \sqrt{3} < 2

(a2)\therefore (a - 2) is between 22 and 33. (b2)(b - 2) is between 33 and 44
b>a\therefore b > a

b4=3b - 4 = \sqrt{3}, which is between 11 and 22
c4=12c - 4 = 1 - \sqrt{2}, which is between 1-1 and 00
b>c\therefore b > c

a2=8a - 2 = \sqrt{8}, which is between 22 and 33
c2=32c - 2 = 3 - \sqrt{2}, which is between 11 and 22
a>c\therefore a > c

Answer: b>a>cb > a > c

Alternatively

8\sqrt{8}, which is between 22 and 33, can be written as 22.##, where ## are some digits after the decimal point.

Applying this to aa, bb and cc, we get

a=2+8=2+2a = 2 + \sqrt{8} = 2 + 2.## = 44.##

b=4+3=4+1b = 4 + \sqrt{3} = 4 + 1.## = 55.##

c=52=51c = 5 - \sqrt{2} = 5 - 1.## = 33.##

b>a>c\therefore b > a > c

Example 3

a=7+6a = \sqrt{7} + \sqrt{6} and b=3+11b = \sqrt{3} + \sqrt{11}. Which of aa and bb is greater?

Solution

a2=(7+6)2=13+242a^{2} = (\sqrt{7} + \sqrt{6})^{2} = 13 + 2 \sqrt{42}
b2=(3+11)2=14+233b^{2} = (\sqrt{3} + \sqrt{11})^{2} = 14 + 2 \sqrt{33}

a213=242a^{2} - 13 = 2 \sqrt{42}, which is between 1212 and 1414
b213=1+233b^{2} - 13 = 1 + 2 \sqrt{33}, which is between 1111 and 1313

As the ranges are overlapping, we square these again
(a213)2=4×42=168(a^{2} - 13)^{2} = 4 \times 42 = 168
(b213)2=133+433(b^{2} - 13)^{2} = 133 + 4 \sqrt{33}, which is between 153153 and 157157

Clearly a>ba > b

Answer: aa is greater

Note: Squaring and subtraction of variable on the Left Hand Side (LHS) in the expressions above is to make our explanations clear. In the exam, you can write down the operations one below the other as shown below.

(7+6)2(\sqrt{7} + \sqrt{6})^{2} and (3+11)2(\sqrt{3} + \sqrt{11})^{2}
13+24213 + 2 \sqrt{42} and 14+23314 + 2 \sqrt{33}
2422 \sqrt{42} and 1+2331 + 2 \sqrt{33}
168168 and 133+433133 + 4 \sqrt{33}

Also, we cannot remove the square roots, add the integers and check. In this case (7+6)<(3+11)(7 + 6) < (3 + 11). However, 7+6>3+11\sqrt{7} + \sqrt{6} > \sqrt{3} + \sqrt{11}

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