which equation can be used to find 150 percent of 500?\n$\frac{150\times5}{100\times5}=\frac{750}{500}$\n$\fr…

which equation can be used to find 150 percent of 500?\n$\frac{150\times5}{100\times5}=\frac{750}{500}$\n$\frac{500\times5}{100\times5}=\frac{2500}{500}$\n$\frac{150\times1}{500\times1}=\frac{150}{500}$\n$\frac{100\times3.3}{150\times3.3}=\frac{330}{495}$

which equation can be used to find 150 percent of 500?\n$\frac{150\times5}{100\times5}=\frac{750}{500}$\n$\frac{500\times5}{100\times5}=\frac{2500}{500}$\n$\frac{150\times1}{500\times1}=\frac{150}{500}$\n$\frac{100\times3.3}{150\times3.3}=\frac{330}{495}$

Answer

Explanation:

Step1: Recall percentage formula

To find (p%) of a number (n), we use the formula (\frac{p}{100}\times n). Here, (p = 150) and (n=500), so we want (\frac{150}{100}\times500). We can rewrite this as an equivalent - fraction form. If we want to keep the denominator as 500, we note that (\frac{150}{100}=\frac{150\times5}{100\times5}) (by multiplying numerator and denominator by 5).

Step2: Analyze the options

We are looking for an equation that represents the correct proportion for finding 150% of 500. The correct proportion for finding 150% of 500 in fraction - form with a denominator of 500 is (\frac{150\times5}{100\times5}=\frac{750}{500}).

Answer:

(\frac{150\times5}{100\times5}=\frac{750}{500}) (First option)