How to find the common factors of squares - PSAT Math
Card 0 of 21
If m and n are postive integers and 4m = 2n, what is the value of m/n?
If m and n are postive integers and 4m = 2n, what is the value of m/n?
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
Compare your answer with the correct one above
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
Compare your answer with the correct one above
Simplify the radical:
Simplify the radical:
Compare your answer with the correct one above
If m and n are postive integers and 4m = 2n, what is the value of m/n?
If m and n are postive integers and 4m = 2n, what is the value of m/n?
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
Compare your answer with the correct one above
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
Compare your answer with the correct one above
Simplify the radical:
Simplify the radical:
Compare your answer with the correct one above
If m and n are postive integers and 4m = 2n, what is the value of m/n?
If m and n are postive integers and 4m = 2n, what is the value of m/n?
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
Compare your answer with the correct one above
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
Compare your answer with the correct one above
Simplify the radical:
Simplify the radical:
Compare your answer with the correct one above
If m and n are postive integers and 4m = 2n, what is the value of m/n?
If m and n are postive integers and 4m = 2n, what is the value of m/n?
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
Compare your answer with the correct one above
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
Compare your answer with the correct one above
Simplify the radical:
Simplify the radical:
Compare your answer with the correct one above
If m and n are postive integers and 4m = 2n, what is the value of m/n?
If m and n are postive integers and 4m = 2n, what is the value of m/n?
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
Compare your answer with the correct one above
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
Compare your answer with the correct one above
Simplify the radical:
Simplify the radical:
Compare your answer with the correct one above
If m and n are postive integers and 4m = 2n, what is the value of m/n?
If m and n are postive integers and 4m = 2n, what is the value of m/n?
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
Compare your answer with the correct one above
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
Compare your answer with the correct one above
Simplify the radical:
Simplify the radical:
Compare your answer with the correct one above
If m and n are postive integers and 4m = 2n, what is the value of m/n?
If m and n are postive integers and 4m = 2n, what is the value of m/n?
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
- 22 = 4. Also, following the rules of exponents, 41 = 1.
- One can therefore say that m = 1 and n = 2.
- The question asks to solve for m/n. Since m = 1 and n = 2, m/n = 1/2.
Compare your answer with the correct one above
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Solve for x:
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
x$\sqrt{45}$+x$\sqrt{72}$=$\sqrt{18}$
Notice how all of the quantities in square roots are divisible by 9
x$\sqrt{9times 5}$+x$\sqrt{9times 8}$=$\sqrt{9times 2}$
x$\sqrt{9}$$\sqrt{5}$+x$\sqrt{9}$$\sqrt{4times 2}$=$\sqrt{9}$$\sqrt{2}$
3x$\sqrt{5}$+3x$\sqrt{4}$$\sqrt{2}$=3$\sqrt{2}$
3x$\sqrt{5}$+6x$\sqrt{2}$=3$\sqrt{2}$
x(3$\sqrt{5}$+6$\sqrt{2}$)=3$\sqrt{2}$
x=\frac{3sqrt{2}$}{3$\sqrt{5}$+6$\sqrt{2}$}
Simplifying, this becomes
x=\frac{sqrt{2}$}{$\sqrt{5}$+2$\sqrt{2}$}
Compare your answer with the correct one above