NATURE of the ROOTS Grade 9 Mathematics Q1.pptx
EmilyBautista10
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Sep 09, 2024
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About This Presentation
Grade 9 Mathematics Quarter 1
Slide Content
Is it possible to get the sum of an infinite number of terms in a geometric sequence? , , , ,…
SUM to INFINITY S =
Lesson 1: Nature of the Roots of Quadratic Equation DISCRIMINANT In a quadratic formula, 𝑥 = −𝑏± 2𝑎 𝑏 2 −4𝑎𝑐 , the radicand b 2 – 4 ac is called the discriminant . The nature of the roots of a quadratic equation can be determined using discriminant .
Remember:
Example 1 : x 2 – 6 x + 8 = Solutions : Determine the values of a , b , and c . x 2 – 6 x + 8 = → a = 1, b = –6, c = 8 Substitute the values of a , b , and c in the discriminant formula. b 2 – 4 ac = (-6) 2 – 4(1)(8) = 36 – 32 = 4 Since the discriminant is 4 and it is positive and a perfect square number, then there are two roots that are real, rational, and unequal .
Example 2 : x 2 – 6 x + 7 = Solutions : Determine the values of a , b , and c . x 2 – 6 x + 7 = → a = 1, b = –6, c = 7 Substitute the values of a , b , and c in the discriminant formula. b 2 – 4 ac = (-6) 2 – 4(1)(7) = 36 – 28 = 8 Since the discriminant is 8 and it is positive and not a perfect square number, then there are two roots that are real, irrational, and unequal .
Example 3 : x 2 – 6 x + 9 = Solutions : Determine the values of a , b , and c . x 2 – 6 x + 9 = → a = 1, b = –6, c = 9 Substitute the values of a , b , and c in the discriminant formula. b 2 – 4 ac = (-6) 2 – 4(1)(9) = 36 – 36 = The discriminant is 0, the root is only one real root .
Example 4 : x 2 – 6 x + 10 = Solutions : Determine the values of a , b , and c . x 2 – 6 x + 10 = → a = 1, b = –6, c = 10 Substitute the values of a , b , and c in the discriminant formula. b 2 – 4 ac = (-6) 2 – 4(1)(10) = 36 – 40 = –4 Since the discriminant is –4 and it is a negative number, then the equation has no real roots . The roots are two non – real or imaginary and unequal .
Example 5: Answer the given word problem. Supposed that Rodolfo has a vacant lot in his backyard. He wants to make as many rectangular plots as possible such that the length of each plot is 2 meters longer its width, in which the area of the plot is ( x )( x + 2) = 10 m 2 . Express the area of the rectangular plot in standard form. Find the values of a , b , and c . What is the value of the discriminant? Describe the nature of the roots of the given quadratic equation.
Example 5: Solutions : A. Express the area of the rectangular plot in standard form. ( x )( x + 2) = 10 → x 2 + 2 x = 10 → x 2 + 2 x – 10 = B. Find the values of a , b , and c . a = 1, b = 2, c = –10 C. What is the value of the discriminant? b 2 – 4 ac = (2) 2 – 4(1)(- 10) = 4 + 40 = 44 D. Describe the nature of the roots of the given quadratic equation. The discriminant is 44 and it is positive and not perfect square, then the nature of the roots are two real, irrational and unequal numbers .
Example 6 : 4 x 2 + 12 x + 9 = Solutions : Determine the values of a , b , and c . 4x 2 + 12 x + 9 = → a = 4, b = 12, c = 9 Substitute the values of a , b , and c in the discriminant formula. b 2 – 4 ac = (12) 2 – 4(4)(9) = 144 – 144 = The discriminant is 0, the roots are real, rational and equal
Example 7 : 3 x 2 – 4 x = 12 Solutions : Transform the equation in standard form. 3 x 2 – 4 x = 12 → 3 x 2 – 4 x – 12 = Determine the values of a , b , and c . a = 1, b = –6, c = 7 Substitute the values of a , b , and c in the discriminant formula. b 2 – 4 ac = (- 4) 2 – 4(3)(- 12) = 16 + 144 = 160 Since the discriminant is 160 and it is positive and not a perfect square number, then there are two roots that are real, irrational, and unequal .
Find the value of b 2 – 4 ac and determine the nature of the roots of the quadratic equations 1)3 x 2 – 4 x = 12 2) x 2 + 8 x + 5 =
Make me SIMPLE! Simplify each of the following by performing the indicated operations. 𝒂 1 . 1 + 1 −𝒃 .
Lesson 2: Sum and Product of Roots of Quadratic Equations The sum and product of the roots of quadratic equations can be solved using the values of a , b , and c . 𝒂 The sum of the roots of a quadratic equation is −𝒃 . 𝒙 𝟏 + 𝒙 𝟐 = −𝒃 𝒂 𝒂 The product of the roots of a quadratic equation is 𝒄 . 𝒄 𝒙 𝟏 ∙ 𝒙 𝟐 = 𝒂
Example 1: Find the sum and product of the roots of x 2 + 8 x + 5 = 0. Solutions : Determine the values of a , b , and c . x 2 + 8 x + 5 = → a = 1, b = 8, c = 5 Substitute the values of a , b and c in the formula. Sum = 𝑥 1 + 𝑥 2 = −𝑏 = −(8) = −8 = −𝟖 𝑎 1 1 Product = 𝑥 1 ∙ 𝑥 2 = 𝑎 𝑐 = 1 5 = 𝟓
Example 2: What are the sum and product of the roots of 3 x 2 – 12 x + 4 = 0? Solutions : Determine the values of a , b , and c . 3 x 2 – 12 x + 4 = → a = 3, b = - 12, c = 4 Substitute the values of a , b and c in the formula. 𝑎 Sum = −𝑏 = −(−12) = 12 = 𝟒 3 3 𝑎 Product = 𝑐 = 𝟒 𝟑
Example 3: Determine the sum and product of the roots of the equation x 2 + 3 x – 28 = 0. Solutions : Determine the values of a , b , and c . x 2 + 3 x – 28 = → a = 1, b = 3, c = - 28 Substitute the values of a , b and c in the formula. 𝑎 Sum = −𝑏 = −(3) = −3 = −𝟑 1 1 Product = 𝑐 = −28 = −𝟐𝟖 𝑎 1
𝟐 Example 4: Find a quadratic equation in which the sum of the solutions is − 𝟏 and 𝟑 the product of the solution is 𝟐 . Solutions : In finding the quadratic equation given the its sum and product, we can use the form x 2 – (sum of roots) x + (product of roots) = Substitute the given sum and product to the formula, we get x 2 – (sum of roots) x + (product of roots) = 𝑥 2 − − 1 2 𝑥 + 2 = → 3 2 1 2 3 𝑥 + 𝑥 + 2 =
Example 4: Solutions : Multiply both sides by the LCD to remove the fraction. 2 6 𝑥 + 1 2 𝑥 + 2 3 = 6 The resulting equation is 𝟔𝒙 𝟐 + 𝟑𝒙 + 𝟒 = 𝟎
Example 5: Determine the sum and product of the roots of the equation x 2 – 6 x = 0. Solutions : Determine the values of a , b , and c . x 2 – 6 x = → a = 1, b = - 6, c = Substitute the values of a , b and c in the formula. 𝑎 Sum = −𝑏 = 1 −(−6) 6 1 = = 𝟔 𝑎 Product = 𝑐 = 1 = 𝟎
Example 6: Find the sum and product of the roots of the equation ( x – 7) 2 = 16. Solutions : Transform the equation in standard form. ( x – 7) 2 = 16 → x 2 – 14 x + 49 = 16 x 2 – 14 x + 33 = Determine the values of a , b , and c . x 2 – 14 x + 33 = → a = 1, b = -14, c = 33 Substitute the values of a , b and c in the formula. 𝑎 Sum = −𝑏 = 1 1 −(−14) = 14 = 𝟏𝟒 𝑎 Product = 𝑐 = 1 33 = 𝟑𝟑
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