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mathdad
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Explain why there are no real numbers that satisfy the equation
$$|x^2 + 4x| = - 12$$
How is this done algebraically?
$$|x^2 + 4x| = - 12$$
How is this done algebraically?
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RTCNTC said:Explain why there are no real numbers that satisfy the equation
|x^2 + 4x| = - 12
How is this done algebraically?
An absolute value equation is an equation that involves the absolute value of a variable. The absolute value of a number is its distance from 0 on a number line, and it is always represented as a positive value. In an absolute value equation, the variable is within the absolute value bars, and the equation will have two solutions.
To solve an absolute value equation, you must isolate the absolute value on one side of the equation. Then, rewrite the absolute value as a positive and negative equation and solve for both cases. The solutions are the values that make the absolute value expression equal to the given number.
Absolute value equations can be used to solve problems involving distance, such as finding the minimum distance between two points or determining the absolute value of a number in real-world scenarios. They are also useful in determining the range of values for a given situation.
If there is no solution to an absolute value equation, it means that the equation has no real solutions. This can occur when the absolute value expression is always positive and cannot equal the given number. In other words, the absolute value equation has no solutions if the number inside the absolute value bars is greater than the number on the other side of the equation.
No, absolute value equations can only have two solutions. This is because the absolute value of a number can only have two values - the positive and negative version of that number. So, when solving an absolute value equation, there will only be two possible solutions.