How to do an Indirect Proof

Written by

Malcolm McKinsey

January 11, 2023

Fact-checked by

Paul Mazzola

Indirect proof definition

Indirect proofin geometry is also calledproof by contradiction. The "indirect" part comes from taking what seems to be the opposite stance from the proof's declaration, then trying to provethat. If you "fail" to prove the falsity of the initial proposition, then the statement must be true. You did not prove it directly; you proved it indirectly, by contradiction.

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Direct vs. indirect proof

An indirect proof can be thought of as "the long way around" a problem. Rather than attack the problem head-on, as with a direct proof, you go through some other steps to try to prove the exactoppositeof the statement. You are subtly intending to fail, so that you can then step back and say, "I did my best to show it was false. I could not prove it was false, so it must be true."

Indirect proof steps

To move through indirect proof logic, you need real confidence and deep content knowledge. The three steps seem simple, much as a one-page cartoon diagram makes assembling furniture seem simple.

Here are the three steps to do an indirect proof:

Assume that the statement is false
Work hard to prove it is false until you bump into something that simply doesn't work, like a contradiction or a bit of unreality (like having to make a statement that "all circles are triangles," for example)
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If you find the contradiction to your attempt to prove falsity, then the opposite condition (the original statement) must be true

First step of indirect proof

Geometricians such as yourself can get hung up on the very first step, because you have to word your assumption of falsity carefully.

You first need to clue the reader in on what you are doing. Most mathematicians do that by beginning their proof something like this:

"Assuming for the sake of contradiction that…"
"If we momentarily assume the statement is false…"
"Let us suppose that the statement is false…"

Aha, says the astute reader, we are in for an indirect proof, or a proof by contradiction.

Then you have to make certain you are saying the opposite of the given statement. You cannot say more or less than that for the initial assumption.

Indirect proof examples

Here are three statements lending themselves to indirect proof. Restate each as the beginning of a proof by contradiction:

Given:Two squares

Prove:The two squares are similar figures

Given:An equilateral△and an angle bisector from any vertex

Prove:The angle bisector is a median

Given:△ABC

Prove:The sum of interior angles of a△is180°

Try to come up with the indirect proof statement for each yourself before looking ahead.

In all three cases, begin by presuming theoppositeof the statement to be the case:

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"Assume for the sake of contradiction that the two squares are not similar figures…"
"Let's assume for the moment that the angle bisector of an equilateral △ is not a median…"
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"If we assume the statement is false, then the sum of interior angles of a △ is more or less than 180°"

When is the right time to try an indirect proof or proof by contradiction? When the statement to be proven true can be questioned: "What if interior angles of triangles donotadd to180°?" Try to prove that; when youfail, you have succeeded!

The question to ask is, "What if that statement is not true?"
The task to answer is, "How can I prove this statement to be false?"
The result should be, "Well, that didn't work, so the original statement has to be true."

Another handy way to use an indirect proof is when the cases showing the statement to be true are simply too numerous to be practical. Consider an assertion like this:

No integers exist that fulfill, 10a+100b=2

Do you really want to provethatby plugging in every conceivable combination of numbers? Here is a sampling:

$a=-3$ a=−3

$b=1$ b=1

$10a+100b=2$ 10a+100b=2

$-30+100\ne 2$ −30+100=2

Hmmm...that didn't work. Let's try another pair:

You could spend every waking minute plugging in numbers without success.

To solve this using an indirect proof, assume integersdoexist that satisfy the equation. Then work the problem:

Given:Where a and b are integers,10a+100b=2

Prove:Integers a and b exist

$10a+100b=2$ 10a+100b=2

Divide both sides by 10:

$a+10b=\frac{2}{10}$ a+10b=102

Wait a minute! How can youaddtwo integers, a and b, and get afractionfor an answer? You cannot; you have proven the falsity of your statement, so the original statement must be true.

Indirect proof in geometry

Suppose we state this:

Given∠Aand∠Bare supplementary angles:

Prove $\angle B<180°$ ∠B<180°

This is easily proved by indirect proof:

Assume $\angle B\ge 180°$ ∠B≥180°the opposite of our original position

$\angle A+\angle B=180°$ ∠A+∠B=180°definition of supplementary angles

You see the contradiction?∠B≥180°cannot be greater than or equal to the sum of both angles. Can∠Abe0°, or even less, a negative?

No; that is not possible.We have proven∠B<180°by indirect proof.

Indirect proof, or proof by contradiction, is yet another useful tool to help you with geometry. Use it wisely (it is not suitable for every problem), tell your reader (or teacher) you are using it, and work carefully.

FAQs

How to do an Indirect Proof | 3 Easy Steps & Examples (Video)? ›

What are the three steps of an indirect proof? STEP 1 - State as an assumption the opposite (negation) of what you want to prove. STEP 2 - Show that this assumption leads to a contradiction. STEP 3 - Conclude that the assumption must be false and that what you want to prove must be true.

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What are the three steps of an indirect proof? ›

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What is indirect proof with an example? ›

An indirect proof, also called a proof by contradiction, is a roundabout way of proving that a theory is true. When we use the indirect proof method, we assume the opposite of our theory to be true. In other words, we assume our theory is false.

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How to show indirect proof? ›

There are two kinds of indirect proofs: the proof by contrapositive, and the proof by contradiction.

The proof by contrapositive is based on the fact that an implication is equivalent to its contrapositive. ...
Assume ¯q is true (hence, assume q is false).
Show that ¯p is true (that is, show that p is false).

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Jul 7, 2021

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How to do indirect proofs in logic? ›

We do indirect proof by assuming the premises to be true and the conclusion to be false and deriving a contradiction. Getting a contradiction shows us that it is impossible for the premises to be true and the conclusion to be false. This means that the conclusion must be true, which means that the argument is valid.

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What is indirect proof simple? ›

Indirect Proof Definition

An indirect proof doesn't require us to prove the conclusion to be true. Instead, it suffices to show that all the alternatives are false. There are two forms of an indirect proof.

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When should you use indirect proof? ›

We can use indirect proofs to prove an implication. There are two kinds of indirect proofs: proof by contrapositive and proof by contradiction. In a proof by contrapositive, we actually use a direct proof to prove the contrapositive of the original implication.

What do you assume in an indirect proof? ›

Answer and Explanation: In an indirect proof, we assume the opposite of a given statement, and then we go about our proof until we run into a contradiction, showing that the it cannot be true, so the opposite, or the original statement, must be true.

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What is an indirect proof also called? ›

In this general sense, proof by contradiction is also known as indirect proof, proof by assuming the opposite, and reductio ad impossibile. A mathematical proof employing proof by contradiction usually proceeds as follows: The proposition to be proved is P.

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Which could be the first step of an indirect proof of the conditional below? ›

The first step of an indirect proof is to assume the negation of the statement and work towards a contradiction.

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What is the indirect proof of a trapezoid? ›

State the indirect proof

Proof: Assume temporarily that the diagonals of the trapezoid bisect each other, that is A O = O C and D O = O B . Therefore, triangles Δ A O B and Δ D O C are congruent by the SAS axiom. Then the corresponding parts AB and DC of these congruent triangles will be congruent.

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What is the indirect method of statement? ›

What's the indirect accounting method? The indirect method for a cash flow statement is a way to present data that shows how much money a company spent or made during a certain period and from what sources. It takes the company's net income and adds or deducts balance sheet items to determine cash flow.

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What is the first step of an indirect proof _________________? ›

The first step in writing an indirect proof is to state as a temporary assumption the opposite (negation) of what you want to prove.

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What is the first step of an indirect proof of the inequality? ›

Step 1 Identify the statement you want to prove. Assume temporarily that this statement is false by assuming that its opposite is true. Step 2 Reason logically until you reach a contradiction. Step 3 Point out that the desired conclusion must be true because the contradiction proves the temporary assumption false.

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What is the rule of indirect proof? ›

An indirect proof relies on a contradiction to prove a given conjecture by assuming the conjecture is not true, and then running into a contradiction proving that the conjecture must be true.

What is the indirect proof? ›

Which of the following are the correct steps to proving a statement using indirect proof? ›

Assume your statement to be false.
Proceed as you would in a direct proof.
Come across a contradiction.
Use the contradiction to state that your assumption of the statement being false can't be the case, so your statement must be true.

Jan 9, 2020

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