Question

How do you find the slope and the intercept of the line \[7x+3y=4\]?

Answer 1

Hint: In order to solve the solve question, first we need to convert the given linear equation in the standard slope intercept form of a linear equation by simplifying the given equation. The slope intercept form of a linear equation is,\[y=mx+b\], where ‘m’ is the slope of the line and ‘b’ is the y-intercept. Then for x-intercept, we need to put the value of y = 0 and solve for the value of ‘x’. in this way we will get all required values.

Complete step by step solution:
We have given that,
\[7x+3y=4\]
As we know that the slope intercept form of a linear equation is,
\[y=mx+b\], where ‘m’ is the slope of the line and ‘b’ is the y-intercept.
Converting the given equation in slope intercept form of equation;
\[7x+3y=4\]
Subtracting 7x from both the sides of the equation, we get
\[3y=4-7x\]
Dividing both the sides of the above equation by 3, we get
\[y=\dfrac{4}{3}-\dfrac{7}{3}x\]
Rewrite the above equation as.
\[y=-\dfrac{7}{3}x+\dfrac{4}{3}\]
Comparing it with the slope intercept form of a linear equation i.e. \[y=mx+b\]
Thus,
Slope = m = \[-\dfrac{7}{3}\]
Y-intercept = b = \[\dfrac{4}{3}\]
Now,
Finding the x-intercept,
We need to put the value of y = 0,
We have,
\[y=-\dfrac{7}{3}x+\dfrac{4}{3}\]
\[0=-\dfrac{7}{3}x+\dfrac{4}{3}\]
Multiplying both the side of equation by 3, we get
\[0=-7x+4\]
Subtracting 4 from both the sides, we get
\[-4=-7x\]
Dividing both the sides of the above equation by -7, we get
\[x=\dfrac{4}{7}\]
Therefore,
The x-intercept is \[\dfrac{4}{7}\].

Note: While solving these types of questions, students need to know the concept of slope intercept form of linear equation. Solve the equation very carefully and do the calculation part very explicitly to avoid making any errors. For a straight line, if two points $A({{x}_{1}},{{y}_{1}})$ and $B({{x}_{2}},{{y}_{2}})$ are situated on the line, then by using the slope formula we can calculate the slope (m) as, $m=\dfrac{{{y}_{2}}-{{y}_{1}}}{{{x}_{2}}-{{x}_{1}}}$.