Question

A continuación se te presenta una tabla de

tres columnas, la primera contiene enuncia-
dos en lenguaje ordinario, que debes traducir
al lenguaje algebraico, luego grafica la región.
Lenguaje ordinario


La suma de un
número más el
doble de otro es a
lo más dos.

La diferencia entre
el cuadrado de un
número y el triple
de otro es como
mínimo una unidad


La suma de los
cuadrados de dos
números no supera
las cuatro unidades


Lenguaje y Gráfico
algebraico

Me pueden ayudar estoy en aprietos

Answer 1

The sum of a number plus the double of another is at most two is x + 2y ≤ 2.

The difference between the square of a number and triple from another it's like minimum one unit is
`x^(2) -3y\geq 1`.

The sum of the squares of two numbers does not exceed the four units is
`x^(2) +y^2\leq 4`.

In order to solve this word problem, we would assign a variable to the unknown number, and then translate the word problem into an algebraic equation as follows:

Let the variable x represent the first unknown number.

Let the variable x represent the second unknown number.

Based on the statement "The sum of a number plus the double of another is at most two," we can logically deduce the following algebraic equation;

x + 2y ≤ 2

Based on the statement "The difference between the square of a number and triple from another it's like minimum one unit," we can logically deduce the following algebraic equation;

`x^(2) -3y\geq 1`

Based on the statement "The sum of the squares of two numbers does not exceed the four units," we can logically deduce the following algebraic equation;

`x^(2) +y^2\leq 4`

In conclusion, we would use an online graphing tool to plot each of the algebraic equations as shown in the images attached below.

Complete Question:

Below is a table of three columns, the first contains statements two in ordinary language, which you must translate to algebraic language, then graph the region.

The sum of a number plus the double of another is at most two.

The difference between the square of a number and triple from another it's like minimum one unit.

The sum of the squares of two numbers does not exceed the four units.