Algebra I: 1001 Practice Problems For Dummies (+ Free Online Practice). Mary Jane Sterling

Algebra I: 1001 Practice Problems For Dummies (+ Free Online Practice) - Mary Jane Sterling


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math

      640. math

      641. math

      642–645 Solve each quadratic equation by “completing the square.”

      642. math

      643. math

      644. math

      645. math

      646–653 Rewrite each as a complex number in the form math.

      646. math

      647. math

      648. math

      649. math

      651. math

      652. math

      653. math

      654–655 Use the quadratic formula to solve the equations. Write your answers as complex numbers.

      654. math

      655. math

      Solving Polynomials with Powers Three and Higher

      Apolynomial is a smooth curve that goes on and on forever, using input variables going from negative infinity to positive infinity. To solve a polynomial means to set the equation equal to 0 and determine which, if any, numbers create a true statement. Any numbers satisfying this equation give you important information: They tell you where the graph of the polynomial crosses or touches the x-axis.

      Solving polynomials in this chapter requires the following techniques:

       Counting the number of possible real roots/zeros, using Descartes’s Rule of Signs

       Making a list of the possible rational roots/zeros, using the Rational Root Theorem

       Putting Descartes’s Rule of Signs and the Rational Root Theorem together to find roots

       Applying the Factor Theorem

       Solving polynomial equations by factoring

       Applying synthetic division

      As you probably know, you can come up with a different answer to a math problem by simply confusing or forgetting one step; here are some things to watch out for:

       Confusing real roots with rational roots; rational roots are real, but real roots aren’t necessarily rational

       Being sure to list all the possible divisors of a number, not missing multiples

       Remembering to change the sign of the numerical part of the divisor when using synthetic division

       Taking roots with multiplicity of more than one into account when looking for factors

      656–659 Count the possible number of positive and negative real roots of the equation.

      656. math

      657. math

      658. math

      659. math

      660–663 List all the possible rational roots for each polynomial equation.

      660. math

      661. math

      662. math

      663. math

      664–667 Check to see which of the given values are roots of the equation.

      664. Given math, check to see whether 2, –2, 3, or 4 is a root.

      665. Given math, check to see whether 1, –1, 3, or –3 is a root.

      666. Given math, determine whether 1, –1, 2, or –2 is a root.

      667. Given math, determine whether 1 or –1 are roots.

      668–685 Solve for


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