What is the solution of the equation 43x=−65 ?(1 point) =
9 answers
x = -65/43
What is the solution of the equation 4/3x=−6/5 ?(1 point)
To solve the equation 4/3x = -6/5, we can first simplify by multiplying both sides of the equation by the reciprocal of 4/3, which is 3/4:
(4/3x)(3/4) = (-6/5)(3/4)
Multiplying the fractions on the left side, the x term cancels out:
1x = (-18/20)
Simplifying further, we can divide both sides by 1:
x = -18/20
Reducing the fraction, we find:
x = -9/10
(4/3x)(3/4) = (-6/5)(3/4)
Multiplying the fractions on the left side, the x term cancels out:
1x = (-18/20)
Simplifying further, we can divide both sides by 1:
x = -18/20
Reducing the fraction, we find:
x = -9/10
Ms. Garcia surveyed the students in her class to find out if they own a pet. Two-thirds of the class, or 8 students, own a pet. Complete the equation that models the total number of students, t , in Ms. Garcia’s class.(1 point)
To complete the equation that models the total number of students, t, in Ms. Garcia's class, we can set up a proportion using the information given.
We know that two-thirds of the class, or 8 students, own a pet. This can be represented as:
(2/3)t = 8
Here, t represents the total number of students in the class.
We know that two-thirds of the class, or 8 students, own a pet. This can be represented as:
(2/3)t = 8
Here, t represents the total number of students in the class.
Julio is making lemonade to be sold at a fair. He bought 5 bags of lemons for $19.75 . Complete the equation that models the cost, c , of each bag of lemons.(1 point)
To complete the equation that models the cost, c, of each bag of lemons, we can set up a proportion using the information given.
We know that Julio bought 5 bags of lemons for $19.75. This can be represented as:
5c = $19.75
Here, c represents the cost of each bag of lemons.
We know that Julio bought 5 bags of lemons for $19.75. This can be represented as:
5c = $19.75
Here, c represents the cost of each bag of lemons.
In her science project, Martina is observing how fast kitchen condiments can be dissolved in water. She put 8.5 ounces of water into each of 5 containers. Complete the equation that models the total amount of water, w , Martina used.
To complete the equation that models the total amount of water, w, Martina used, we need to consider the amount of water she put into each container and the total number of containers.
We know that Martina put 8.5 ounces of water into each of 5 containers. To find the total amount of water used, we can multiply the amount of water per container by the number of containers.
This can be represented as:
w = 8.5 * 5
Here, w represents the total amount of water Martina used.
We know that Martina put 8.5 ounces of water into each of 5 containers. To find the total amount of water used, we can multiply the amount of water per container by the number of containers.
This can be represented as:
w = 8.5 * 5
Here, w represents the total amount of water Martina used.