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Example 1: finding the point of intersection using a graph. Find the point of intersection of the lines y=x+4 y = x + 4 and y=2x−3. y = 2x − 3. Plot the graph of the first equation. First plot a graph of the equation y=x+4. y = x + 4. Draw a table of values (3 3 or 4 4 points are sufficient). x.
Example 1: finding the point of intersection using a graph. Find the point of intersection of the lines y=x+4 and y=2x-3. Plot the graph of the first equation. First plot a graph of the equation y=x+4. Draw a table of values (3 or 4 points are sufficient). 2 On the same set of axes, plot the graph of the second equation.
Help your students prepare for their Maths GCSE with this free intersecting lines worksheet of 45 questions and answers. Section 1 of the intersecting lines free worksheet contains 36 skills-based intersecting lines questions, in 3 groups to support differentiation. Section 2 of the intersecting lines printable worksheet contains 5 applied ...
- Complete the following statements with either sometimes, never, and always. Parallel lines can ____________ be intersecting lines. Perpendicular lines can ____________ be intersecting lines.
- Which of the following statements is not true? Three intersecting lines can share a common point of intersection. Two intersecting lines form two pairs of vertical angles.
- Construct a line that will intersect Line $\overline{AB}$. Label the line and intersection point, then name four angles formed by the two intersecting lines.
- It will be impossible to create four intersecting lines that only share one point of intersection. Prove the statement wrong by constructing a counterexample.
Question 1 : Find the point of intersection of two straight lines given below. x - 5y + 17 = 0 and 2x + y + 1 = 0. (A) (2 , 8) (B) (-2 , 3) (C) (-2 , 5) Solution. Question 2 : Find the point of intersection of two straight lines given below. 5x - 3y - 8 = 0 and 2x - 3y - 5 = 0. (A) (1 , -1) (B) (-2 , 1) (C) (1 , 0)
Real-life Examples of Intersecting Lines. Scissors: The two arms of a pair of scissors. Crossroads: Two roads (considered straight lines) meeting at a common point make crossroads. Patterns: The lines on the floor. We use the word “intersection” in daily life in reference to roads or streets.
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Definition of Intersecting Lines: If two lines have one common point, they are called intersecting lines. For Example: (i) Two adjacent edges of a notebook. (ii) Crossing roads. (iii) The multiplication sign (×) etc. are the examples of the intersecting lines. In the given figure ↔AB ↔ A B and ↔CD ↔ C D intersect each other at point O.
