High School

We appreciate your visit to A landscaper buys 4 peonies and 9 geraniums for 190 Another landscaper buys 5 peonies and 6 geraniums for 185 Write a system of linear. This page offers clear insights and highlights the essential aspects of the topic. Our goal is to provide a helpful and engaging learning experience. Explore the content and find the answers you need!

A landscaper buys 4 peonies and 9 geraniums for $190. Another landscaper buys 5 peonies and 6 geraniums for $185.

Write a system of linear equations to find the cost of each plant.

Answer :

The problem presented asks for a system of linear equations to find the cost of peonies and geraniums from two separate purchases. The first equation from the purchases is 4P + 9G = $190, and the second is 5P + 6G = $185, with P representing the cost of a peony and G the cost of a geranium.

The question involves setting up a system of linear equations to determine the cost of individual plants based on the total cost of different combinations purchased by two landscapers. Let's denote the cost of a peony as P and the cost of a geranium as G. The first landscaper's purchase gives us the equation 4P + 9G = $190. The second landscaper's purchase gives us the equation 5P + 6G = $185. We have a system of two linear equations with two variables.

To solve the system, one could use methods such as substitution, elimination, or matrix operations to find the values for P (cost of peony) and G (cost of geranium).

Thanks for taking the time to read A landscaper buys 4 peonies and 9 geraniums for 190 Another landscaper buys 5 peonies and 6 geraniums for 185 Write a system of linear. We hope the insights shared have been valuable and enhanced your understanding of the topic. Don�t hesitate to browse our website for more informative and engaging content!

Rewritten by : Barada

The cost of one peony is $30, and the cost of one geranium is $10, obtained by solving the system of linear equations.

How we wrote a system of linear equations to find the cost of each plant (peonies and geraniums) given the purchase details and prices.

To obtain these values, a system of linear equations is necessary.

The first equation states that 4 peonies and 9 geraniums were purchased for a total cost of $190. This equation can be represented as 4P + 9G = 190.

The second equation indicates that 5 peonies and 6 geraniums were bought for $185. This equation can be written as 5P + 6G = 185.

By solving this system of linear equations, the values of P and G can be determined, representing the cost of each plant.

The solution reveals that one peony costs $30, while one geranium costs $10.

It is important to note that these values are rounded to the nearest dollar, and they satisfy the given purchase details and prices.

Learn more about linear equations

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