All PSAT Math Resources
Example Questions
Example Question #124 : New Sat Math Calculator
Solve the following inequality for , round your answer to the nearest tenth.
The first step is to square each side of the inequality.
Now simplify each side.
Now subtract the left side of the inequality to make it zero, so that we can use the quadratic formula.
Now we can use the quadratic formula.
Recall the quadratic formula.
Where , , and , correspond to coefficients in the quadratic equation.
In this case , , and .
Now plug these values into the quadratic equation, and we get.
Now since we are dealing with an inequality, we put the least value on the left side, and the greatest value on the right. It will look like the following.
Example Question #125 : New Sat Math Calculator
Solve the following inequality for , round your answer to the nearest tenth.
The first step is to square each side of the inequality.
Now simplify each side.
Now subtract the left side of the inequality to make it zero, so that we can use the quadratic formula.
Now we can use the quadratic formula.
Recall the quadratic formula.
Where , , and , correspond to coefficients in the quadratic equation.
In this case , , and .
Now plug these values into the quadratic equation, and we get.
Now since we are dealing with an inequality, we put the least value on the left side, and the greatest value on the right. It will look like the following.
Example Question #126 : New Sat Math Calculator
Solve the following inequality for , round your answer to the nearest tenth.
The first step is to square each side of the inequality.
Now simplify each side.
Now subtract the left side of the inequality to make it zero, so that we can use the quadratic formula.
Now we can use the quadratic formula.
Recall the quadratic formula.
Where , , and , correspond to coefficients in the quadratic equation.
In this case , , and .
Now plug these values into the quadratic equation, and we get.
Now since we are dealing with an inequality, we put the least value on the left side, and the greatest value on the right. It will look like the following.
Example Question #127 : New Sat Math Calculator
Solve the following inequality for , round your answer to the nearest tenth.
The first step is to square each side of the inequality.
Now simplify each side.
Now subtract the left side of the inequality to make it zero, so that we can use the quadratic formula.
Now we can use the quadratic formula.
Recall the quadratic formula.
Where , , and , correspond to coefficients in the quadratic equation.
In this case , , and .
Now plug these values into the quadratic equation, and we get.
Now since we are dealing with an inequality, we put the least value on the left side, and the greatest value on the right. It will look like the following.
Example Question #128 : New Sat Math Calculator
Solve the following inequality for , round your answer to the nearest tenth.
The first step is to square each side of the inequality.
Now simplify each side.
Now subtract the left side of the inequality to make it zero, so that we can use the quadratic formula.
Now we can use the quadratic formula.
Recall the quadratic formula.
Where , , and , correspond to coefficients in the quadratic equation.
In this case , , and .
Now plug these values into the quadratic equation, and we get.
Now since we are dealing with an inequality, we put the least value on the left side, and the greatest value on the right. It will look like the following.
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