Select your language

Suggested languages for you:

Deutsch (DE)

Deutsch (UK)

Deutsch (US)

Americas

English (US)

Europe

Q. 12

Expert-verified

Precalculus Enhanced with Graphing Utilities

Found in: Page 889

Book edition 6th

Author(s) Sullivan

Pages 1200 pages

ISBN 9780321795465

Answers without the blur.

Just sign up for free and you're in.

Short Answer

True or False Every polynomial function is continuous at every real number.

The statement is True.

See the step by step solution

Step by Step Solution

TABLE OF CONTENTS :

TABLE OF CONTENTS

Step. 1 Polynomial function

Polynomial function is a function which has only non-negative integral powers of the variable in an equation.

Step. 2 Conclusion

So by the definition of the polynomial function, these functions does not have any critical points or the points which make it in indeterminant form. Thatswhy, All polynomial functions are continuous at every real number.

Recommended explanations on Math Textbooks

94% of StudySmarter users get better grades.

Find Study Materials for

Create Study Materials

Select your language

Precalculus Enhanced with Graphing Utilities

Answers without the blur.

Short Answer

True or False Every polynomial function is continuous at every real number.

Step by Step Solution

Step. 1 Polynomial function

Step. 2 Conclusion

Most popular questions for Math Textbooks

Want to see more solutions like these?

Recommended explanations on Math Textbooks

Select your language

Precalculus Enhanced with Graphing Utilities

Answers without the blur.

Short Answer

True or False Every polynomial function is continuous at every real number.

Step by Step Solution

Step. 1 Polynomial function

Step. 2 Conclusion

Most popular questions for Math Textbooks

Want to see more solutions like these?

Recommended explanations on Math Textbooks

Decision Maths

Calculus

Probability and Statistics

Statistics

Mechanics Maths

Geometry

Pure Maths