Using the Property of Equality, what first step would you take to rearrange the formula y=mx+b using x as the quantity of interest?
Divide both sides by m. Divide both sides by m . Subtract b from both sides of the equation. Subtract b from both sides of the equation. Subtract mx from both sides. Subtract m x from both sides. Divide both sides by y.
13 answers
To rearrange the formula y=mx+b using x as the quantity of interest, the first step would be to subtract b from both sides of the equation.
Which of the following is an example of using the Division Property of Equality to rearrange the equation PV=nRT ?
R=nTPV upper R equals Start Fraction n upper T over upper P upper V End Fraction n=PVRT n equals Start Fraction upper P upper V over upper R upper T End Fraction R=PV−nT upper R equals upper P upper V minus n upper T T=PVnR upper T equals upper P upper V n upper R
R=nTPV upper R equals Start Fraction n upper T over upper P upper V End Fraction n=PVRT n equals Start Fraction upper P upper V over upper R upper T End Fraction R=PV−nT upper R equals upper P upper V minus n upper T T=PVnR upper T equals upper P upper V n upper R
The correct example of using the Division Property of Equality to rearrange the equation PV=nRT is n=PVRT.
What option is it?
The correct option is n=PVRT.
Are you sure?
Apologies for the confusion. The correct example of using the Division Property of Equality to rearrange the equation PV=nRT is T=PVnR.
Given the formula for the circumference of a circle, C=2πr , how would you rearrange the formula if you were interested in finding the radius of the circle?
r=C2π r equals Start Fraction upper C over 2 pi End Fraction r=2πC r equals 2 pi upper C r=Cπ2 r equals Start Fraction upper C pi over 2 End Fraction r=Cπ
r=C2π r equals Start Fraction upper C over 2 pi End Fraction r=2πC r equals 2 pi upper C r=Cπ2 r equals Start Fraction upper C pi over 2 End Fraction r=Cπ
To rearrange the formula if you are interested in finding the radius of the circle, the correct step would be:
r = C/(2π)
r = C/(2π)
Given the formula for the volume of a box, V=lwh , which equation best represents the remaining units when justifying your rearrangement to solve for the width?
in.3in.2=in. Start Fraction in. cubed over in. squared End Fraction equals in. in.=in. in. equals in. in.3=in.3 in. cubed equals in. cubed in.3in.2=in.3in.2
in.3in.2=in. Start Fraction in. cubed over in. squared End Fraction equals in. in.=in. in. equals in. in.3=in.3 in. cubed equals in. cubed in.3in.2=in.3in.2
To solve for the width in the formula V=lwh, the remaining units after rearrangement would be:
in.=in.3/in.2
Therefore, the correct equation that best represents the remaining units when justifying the rearrangement is "in.=in.3/in.2".
in.=in.3/in.2
Therefore, the correct equation that best represents the remaining units when justifying the rearrangement is "in.=in.3/in.2".
Consider the formula that relates distance, velocity, and time (d=vt). If you are interested in the time it takes for a ladybug traveling at a speed of 3 inches per second to crawl up a 10-foot section of wall, which unit conversion makes the most sense to use?
Converting feet to inches by multiplying 11 feet by 1 foot12 inches. Converting feet to inches by multiplying 11 feet by Start Fraction 1 foot over 12 inches End Fraction . Converting feet to inches by multiplying 10 feet by 12. Converting feet to inches by multiplying 10 feet by 12. Converting feet to inches by multiplying 10 feet by 12 inches1 foot. Converting feet to inches by multiplying 10 feet by Start Fraction 12 inches over 1 foot End Fraction . Converting feet to inches by dividing 10 feet by 12 inches1 foot.
Converting feet to inches by multiplying 11 feet by 1 foot12 inches. Converting feet to inches by multiplying 11 feet by Start Fraction 1 foot over 12 inches End Fraction . Converting feet to inches by multiplying 10 feet by 12. Converting feet to inches by multiplying 10 feet by 12. Converting feet to inches by multiplying 10 feet by 12 inches1 foot. Converting feet to inches by multiplying 10 feet by Start Fraction 12 inches over 1 foot End Fraction . Converting feet to inches by dividing 10 feet by 12 inches1 foot.
To convert 10 feet to inches, it makes the most sense to multiply 10 feet by 12 inches/1 foot.
So, the correct unit conversion to use in this scenario would be:
Converting feet to inches by multiplying 10 feet by 12 inches/1 foot.
So, the correct unit conversion to use in this scenario would be:
Converting feet to inches by multiplying 10 feet by 12 inches/1 foot.