Solve for x
x\in \left(-\infty,0\right)\cup \left(1.5,\infty\right)
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-1.5x+x^{2}>0
Multiply the inequality by -1 to make the coefficient of the highest power in 1.5x-x^{2} positive. Since -1 is negative, the inequality direction is changed.
x\left(x-1.5\right)>0
Factor out x.
x<0 x-1.5<0
For the product to be positive, x and x-1.5 have to be both negative or both positive. Consider the case when x and x-1.5 are both negative.
x<0
The solution satisfying both inequalities is x<0.
x-1.5>0 x>0
Consider the case when x and x-1.5 are both positive.
x>1.5
The solution satisfying both inequalities is x>1.5.
x<0\text{; }x>1.5
The final solution is the union of the obtained solutions.
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Limits
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