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How to Graph y=sqrt(x)

Instructions:

Choose an answer and hit 'next'. You will receive your score and answers at the end.

question 1 of 3

What is the domain and range of y = sqrt(x)?

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1. Which of the following is the graph of y = sqrt(x)?

2. Which of the following statements are true?

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About This Quiz & Worksheet

For this quiz, we'll ask you questions about graphing radical functions. Not only will you need to understand this concept from a general standpoint, but you'll need to be able to apply this knowledge to specific practice problems.

Quiz & Worksheet Goals

We would like to see if you can:

  • Find the domain and range of y = sqrt(x)
  • Select the graph that represents: y = sqrt(x)
  • Choose a true statement about graphing radical functions
  • Restrict the domain of y to create the inverse function of a radical function
  • Find which point appears on the graph of a radical function with a restricted domain

Skills Practiced

Here are just some of the skills you'll use during the quiz

  • Reading comprehension - ensure that you draw the most important information from the related graphing radical functions lesson
  • Problem solving - use acquired knowledge to solve graphing radical functions practice problems
  • Interpreting information - verify that you can read and interpret radical functions correctly by accurately associating to a graph
  • Defining key concepts - ensure that you can accurately define main phrases, such as restricted domain and range
  • Critical thinking - use what you know about radical functions and restricted domains to determine if a point would appear on the graph of a particular radical function

Additional Learning

You can go over this information in our lesson, How to Graph y=sqrt(x). With a professional quality lesson at your fingertips, you'll understand this topic with ease. By the time you're finished, you'll be able to:

  • Use strategic numbers to determine the general shape of a graph
  • Make simple observations about radical functions
  • Graph y = sqrt(x) in alternative ways
  • Determine which quadrant a radical function will appear in
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