Answer:
1. if it is a solution, it meets the expectation. For example, 3< 4 , it is true that 3 is less than 4. However, if the value isn't in the expected value, it is not a solution.
2.A quadratic inequality is a mathematical statement that relates a quadratic expression as either less than or greater than another. Some examples of quadratic inequalities solved in this section follow.
A quadratic inequality is a mathematical statement that relates a quadratic expression as either less than or greater than another. Some examples of quadratic inequalities solved in this section follow.x2−2x−11≤02x2−7x+3>09−x2>0
A quadratic inequality is a mathematical statement that relates a quadratic expression as either less than or greater than another. Some examples of quadratic inequalities solved in this section follow.x2−2x−11≤02x2−7x+3>09−x2>0A solution to a quadratic inequality is a real number that will produce a true statement when substituted for the variable.
A quadratic inequality is a mathematical statement that relates a quadratic expression as either less than or greater than another. Some examples of quadratic inequalities solved in this section follow.x2−2x−11≤02x2−7x+3>09−x2>0A solution to a quadratic inequality is a real number that will produce a true statement when substituted for the variable.Example 1
A quadratic inequality is a mathematical statement that relates a quadratic expression as either less than or greater than another. Some examples of quadratic inequalities solved in this section follow.x2−2x−11≤02x2−7x+3>09−x2>0A solution to a quadratic inequality is a real number that will produce a true statement when substituted for the variable.Example 1Are −3, −2, and −1 solutions to x2−x−6≤0?
A quadratic inequality is a mathematical statement that relates a quadratic expression as either less than or greater than another. Some examples of quadratic inequalities solved in this section follow.x2−2x−11≤02x2−7x+3>09−x2>0A solution to a quadratic inequality is a real number that will produce a true statement when substituted for the variable.Example 1Are −3, −2, and −1 solutions to x2−x−6≤0?Solution:
A quadratic inequality is a mathematical statement that relates a quadratic expression as either less than or greater than another. Some examples of quadratic inequalities solved in this section follow.x2−2x−11≤02x2−7x+3>09−x2>0A solution to a quadratic inequality is a real number that will produce a true statement when substituted for the variable.Example 1Are −3, −2, and −1 solutions to x2−x−6≤0?Solution:Substitute the given value in for x and simplify.
A quadratic inequality is a mathematical statement that relates a quadratic expression as either less than or greater than another. Some examples of quadratic inequalities solved in this section follow.x2−2x−11≤02x2−7x+3>09−x2>0A solution to a quadratic inequality is a real number that will produce a true statement when substituted for the variable.Example 1Are −3, −2, and −1 solutions to x2−x−6≤0?Solution:Substitute the given value in for x and simplify.x2−x−6≤0x2−x−6≤0x2−x−6≤0(−3)2−(−3)−6≤0(−2)2−(−2)−6≤0(−1)2−(−1)−6≤09+3−6≤04+2−6≤01+1−6≤06≤0✗0≤0✓−4≤0✓
A quadratic inequality is a mathematical statement that relates a quadratic expression as either less than or greater than another. Some examples of quadratic inequalities solved in this section follow.x2−2x−11≤02x2−7x+3>09−x2>0A solution to a quadratic inequality is a real number that will produce a true statement when substituted for the variable.Example 1Are −3, −2, and −1 solutions to x2−x−6≤0?Solution:Substitute the given value in for x and simplify.x2−x−6≤0x2−x−6≤0x2−x−6≤0(−3)2−(−3)−6≤0(−2)2−(−2)−6≤0(−1)2−(−1)−6≤09+3−6≤04+2−6≤01+1−6≤06≤0✗0≤0✓−4≤0✓Answer: −2 and −1 are solutions and −3 is not.
