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Q2(i):
Write four solutions for each of the following equations:
(i) $2x + y = 7$
Solution :
Initial Setup & Algebraic Isolation
We are given the linear equation in two variables:
$2x + y = 7$
To systematically find solutions for this equation, it is mathematically highly efficient to express one variable in terms of the other. We will isolate the dependent variable $y$ on the left side of the equation [Per the fundamental properties of equality, by subtracting $2x$ from both sides].
$y = 7 - 2x$
A "solution" to a linear equation in two variables is an ordered pair $(x, y)$ that satisfies the equation. Since this is a linear equation defined over the set of real numbers ($\mathbb{R}$), it possesses infinitely many solutions. We will select four arbitrary integer values for the independent variable $x$ to compute the corresponding values of $y$.
Step 1: Calculating the First Solution
Let us assign the value $x = 0$. Substituting this into our isolated equation:
$y = 7 - 2(0)$
$y = 7 - 0$
$y = 7$
This yields our first ordered pair: $(0, 7)$.
Step 2: Calculating the Second Solution
Let us assign the value $x = 1$. Substituting this into the equation:
$y = 7 - 2(1)$
$y = 7 - 2$
$y = 5$
This yields our second ordered pair: $(1, 5)$.
Step 3: Calculating the Third Solution
Let us assign the value $x = 2$. Substituting this into the equation:
$y = 7 - 2(2)$
$y = 7 - 4$
$y = 3$
This yields our third ordered pair: $(2, 3)$.
Step 4: Calculating the Fourth Solution
Let us assign the value $x = 3$. Substituting this into the equation:
$y = 7 - 2(3)$
$y = 7 - 6$
$y = 1$
This yields our fourth ordered pair: $(3, 1)$.
Tabular Representation of Solutions
We can organize the derived coordinates into a data table to clearly demonstrate the linear relationship between $x$ and $y$. Notice that for every $1$ unit increase in $x$, $y$ decreases by $2$ units [This represents the slope of the line, $m = -2$].
| Independent Variable ($x$) | Dependent Variable ($y$) | Ordered Pair $(x, y)$ |
|---|---|---|
| $0$ | $7$ | $(0, 7)$ |
| $1$ | $5$ | $(1, 5)$ |
| $2$ | $3$ | $(2, 3)$ |
| $3$ | $1$ | $(3, 1)$ |
Graphical Representation (Cartesian Plane)
Plotting these four points on a Cartesian coordinate system verifies that they are collinear, forming the straight line defined by $2x + y = 7$.
Final Solution: Four distinct solutions for the linear equation $2x + y = 7$ are $(0, 7)$, $(1, 5)$, $(2, 3)$, and $(3, 1)$.
More Questions from Class 9 Mathematics Linear Equations in Two Variables EXERCISE 4.2
- Q1: Which one of the following options is true, and why? $y = 3x + 5$ has
- Q2(ii): Write four solutions for each of the following equations: (ii) $\pi x + y = 9$
- Q2(iii): Write four solutions for each of the following equations: (iii) $x = 4y$
- Q3(i): Check which of the following are solutions of the equation $x - 2y = 4$ and which are not: (i) $(0, 2)$
- Q3(ii): Check which of the following are solutions of the equation $x - 2y = 4$ and which are not: (ii) $(2, 0)$
- Q3(iii): Check which of the following are solutions of the equation $x - 2y = 4$ and which are not: (iii) $(4, 0)$
- Q3(iv): Check which of the following are solutions of the equation $x - 2y = 4$ and which are not: (iv) $(\sqrt{2}, 4\sqrt{2})$
- Q3(v): Check which of the following are solutions of the equation $x - 2y = 4$ and which are not: (v) $(1, 1)$
- Q4: Find the value of $k$, if $x = 2$, $y = 1$ is a solution of the equation $2x + 3y = k$.
CBSE Solutions for Class 9 Mathematics Linear Equations in Two Variables
Chapters in CBSE - Class 9 Mathematics
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