Algebra II : Mathematical Relationships and Basic Graphs

Study concepts, example questions & explanations for Algebra II

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Example Questions

Example Question #51 : Review And Other Topics

Simplify, if possible:  

Possible Answers:

Correct answer:

Explanation:

The radicals given are not in like-terms.  To simplify, take the common factors for each of the radicals and separate the radicals.  A radical times itself will eliminate the square root sign.

Now that each radical is in its like term, we can now combine like-terms.

Example Question #23 : Adding And Subtracting Radicals

Possible Answers:

Correct answer:

Explanation:

When adding or subtracting radicals, the radicand value must be equal. Since  and  are not the same, we leave the answer as it is. Answer is .

Example Question #21 : Adding And Subtracting Radicals

Possible Answers:

Correct answer:

Explanation:

Since they share the same radicand, we can add them easily. We just add the coefficients in front of the radical. So our answer is .

Example Question #22 : Adding And Subtracting Radicals

Possible Answers:

Correct answer:

Explanation:

Since the radicand are the same, we can subtract with the coefficients. Since  is greater than  and is negative, our answer is negative. We treat as a subtraction problem. Answer is .

Example Question #26 : Adding And Subtracting Radicals

Possible Answers:

 

Correct answer:

Explanation:

Although the radicands are different, we can simplify them to see if they can have the same radicands. We need to find perrfect squares.

 Indeed we have the same radicands, so we can add them easily with the coefficients.

Answer is .

Example Question #22 : Adding And Subtracting Radicals

Possible Answers:

Correct answer:

Explanation:

Although the radicands are different, we can simplify them to see if they can have the same radicands. We need to find perrfect squares.

 Indeed we have the same radicands, so we can subract them easily with the coefficients.

Answer is .

Example Question #22 : Adding And Subtracting Radicals

Possible Answers:

The answer is not present

Correct answer:

Explanation:

We can only combine radicals that are similar or that have the same radicand (number under the square root).

Combine like radicals:

We cannot add further.

Note that when adding radicals there is a 1 understood to be in front of the radical similar to how a whole number is understood to be "over 1".

 

Example Question #29 : Adding And Subtracting Radicals

Simplify the following expression:

Possible Answers:

Correct answer:

Explanation:

To simplify the expression, we must remember that only terms with the same radical can be added or subtracted, and when we add or subtract the terms, we are only doing so to the coefficients. (Think of the radicals as a variable. When we add two terms, we add coefficients of the same variable together but we never change the variable.)

Keeping this in mind, we get

Example Question #30 : Adding And Subtracting Radicals

Add:

Possible Answers:

Correct answer:

Explanation:

First you must find the factors of each number which will give you one perfect square and a non perfect square as follows:

And remembering a property of the square root:

Making the problem now:

Take the square root of the known perfect squares:

Combine like terms to give the answer:

Example Question #1401 : Mathematical Relationships And Basic Graphs

What is ?

Possible Answers:

Correct answer:

Explanation:

When it comes to adding and subtracting square roots, you can only do it if the radicands (the numbers inside), are the same. This boils the question down to:

Now we add the constants, the numbers on the outside, together.  The radicands stay the same:

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