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International Studies Charter School

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Presentation on theme: "International Studies Charter School"β€” Presentation transcript:

1 International Studies Charter School
Bell Ringer Mrs. Rivas International Studies Charter School Factor the following expression. 𝒂)βˆ’ 𝒙 𝟐 +πŸ‘π’™+πŸπŸ– 𝒃)βˆ’πŸ‘ 𝒙 𝟐 +𝒙+πŸπŸ’ βˆ’ 𝒙 𝟐 βˆ’πŸ‘π’™βˆ’πŸπŸ– βˆ’ πŸ‘π’™ 𝟐 βˆ’π’™βˆ’πŸπŸ’ πŸ‘π’™ 𝒙 βˆ’πŸ” βˆ’πŸ”π’™ πŸ”π’™ πŸ‘π’™ βˆ’πŸ• βˆ’πŸ•π’™ 𝒙 + πŸ‘ 𝒙 + 𝟐 πŸ‘π’™βˆ’πŸ”π’™=βˆ’πŸ‘π’™ πŸ”π’™βˆ’πŸ•π’™=βˆ’π’™ βˆ’ π’™βˆ’πŸ” 𝒙+πŸ‘ βˆ’ πŸ‘π’™βˆ’πŸ• 𝒙+𝟐

2 International Studies Charter School
Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square Objective: To solve equations by completing the square and to rewrite functions by completing the square Essential UnderstandingΒ Completing a perfect square trinomial allows you to factor the completed trinomial as the square of a binomial. Β You can solve an equation that contains a perfect square by finding square roots. The simplest of this type of equations has the form 𝒂 𝒙 𝟐 =𝒄

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square βˆ’πŸπŸŽ βˆ’πŸπŸŽ +πŸ“ +πŸ“ πŸ’ 𝒙 𝟐 =πŸ‘πŸ” πŸ‘ 𝒙 𝟐 =πŸ‘πŸŽ πŸ’ πŸ’ πŸ‘ πŸ‘ 𝒙 𝟐 =πŸ— 𝒙 𝟐 =𝟏𝟎 𝒙= πŸ— 𝒙=Β± 𝟏𝟎 𝒙=Β±πŸ‘

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square 𝒙=Β± πŸ“ 𝒙=Β± 𝟐

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square 𝟏.πŸ” 𝟏 = ? πŸ’πŸ π’Šπ’ 𝟏.πŸ” 𝟏 = πŸπŸ–πŸπŸ.πŸ’ π’Šπ’ 𝟐 𝒙 𝟐 𝟏.πŸ” 𝒙 𝟐 =πŸπŸ–πŸπŸ.πŸ’ π’Šπ’ 𝟐 𝟏.πŸ” 𝟏 = πŸ”πŸ.𝟐 π’Šπ’ πŸ’πŸ π’Šπ’ 𝒙 𝟐 =πŸπŸ•πŸ”πŸ’ π’Šπ’ 𝟐 𝒙 𝟐 = πŸπŸ•πŸ”πŸ’ π’Šπ’ 𝟐 πŸ’πŸ π’Šπ’ π’ƒπ’š πŸ”πŸ•.𝟐 π’Šπ’ 𝒙=πŸ’πŸ π’Šπ’

10 International Studies Charter School
Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square Completing the Square You can for a perfect square trinomial from 𝒙 𝟐 +𝒃𝒙 by adding 𝒃 𝟐 𝟐 𝒙 𝟐 +𝒃𝒙+ 𝒃 𝟐 𝟐 = 𝒙+ 𝒃 𝟐 𝟐

14 Completing the Square Mrs. Rivas
Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square Solving an equation by completing the square Step 1. Β Rewrite the equation in the form 𝒙 𝟐 +𝒃𝒙=𝒄. To do this, get all terms with the variable on one side of the equation and the constant on the other side. Divide all the terms of the equation by the coefficient of π‘₯ 2 if it is not 1. Step 2. Complete the square by adding 𝒃 𝟐 𝟐 to each side of the equation. Step 3. Factor the trinomial. Step 4. Find the square root. Step 5. Solve for π‘₯.

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

17 International Studies Charter School Remember c is the y-intercept
Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square Step 2 Find 𝑏 2 2 π‘₯ 2 +4π‘₯ + _____=6+____ Step 1 move c to the other side π‘₯ 2 +4π‘₯ +πŸ’=6+πŸ’ = Step 3 Factor the perfect square trinomial π‘₯ 2 +4π‘₯ +πŸ’=10 π‘₯+2 2 =10 Step 4 move c back to the left =πŸ’ 𝑦= π‘₯+2 2 βˆ’10 Remember c is the y-intercept 𝒗𝒆𝒓𝒕𝒆𝒙 βˆ’πŸ,βˆ’πŸπŸŽ π’šβˆ’π’Šπ’π’•π’†π’“π’„π’†π’‘π’• 𝟎,βˆ’πŸ” π’š=𝒂 𝒙 𝟐 +𝒃𝒙+𝒄

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square π‘₯ 2 +3π‘₯ + _____=6+____ π‘₯ 2 +3π‘₯+ πŸ— πŸ’ =6+ πŸ— πŸ’ = π‘₯ = πŸ‘πŸ‘ πŸ’ = πŸ— πŸ’ 𝑦= π‘₯ βˆ’ πŸ‘πŸ‘ πŸ’ 𝒗𝒆𝒓𝒕𝒆𝒙 βˆ’ πŸ‘ 𝟐 ,βˆ’ πŸ‘πŸ‘ πŸ’ π’šβˆ’π’Šπ’π’•π’†π’“π’„π’†π’‘π’• 𝟎,βˆ’πŸ”

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square

20 Completing the Square Mrs. Rivas 2 π‘₯ 2 βˆ’π‘₯+3=π‘₯+9 βˆ’π‘₯βˆ’9 βˆ’π‘₯βˆ’9
Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square Ignore the 2 completely since 2 is not and answer. 2 π‘₯ 2 βˆ’π‘₯+3=π‘₯+9 βˆ’π‘₯βˆ’9 βˆ’π‘₯βˆ’9 π‘₯βˆ’ = 13 4 2 π‘₯ 2 βˆ’2π‘₯βˆ’6=0 2 π‘₯ 2 βˆ’π‘₯βˆ’3 =0 π‘₯βˆ’ = π‘₯ 2 βˆ’π‘₯βˆ’3=0 π‘₯ 2 βˆ’π‘₯=3 π‘₯βˆ’ 1 2 = π‘₯ 2 βˆ’π‘₯+ βˆ’ =3 + βˆ’ π‘₯ 2 βˆ’π‘₯+ 1 4 =3+ 1 4 𝒙= 𝟏± πŸπŸ‘ 𝟐

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Section 4-6 Mrs. Rivas International Studies Charter School Completing the Square 2 π‘₯ 2 βˆ’π‘₯+3=π‘₯+9 π‘₯= 2Β± βˆ’π‘₯βˆ’9 βˆ’π‘₯βˆ’9 2 π‘₯ 2 βˆ’2π‘₯βˆ’6=0 π‘₯= 2Β± 2βˆ™2βˆ™13 4 π‘Ž 𝑏 𝑐 π‘₯= βˆ’π‘Β± 𝑏 2 βˆ’4π‘Žπ‘ 2π‘Ž π‘₯= 2Β± π‘₯= βˆ’(βˆ’2)Β± (βˆ’2) 2 βˆ’4(2)(βˆ’6) 2(2) π‘₯= 𝟏± πŸπŸ‘ 𝟐 π‘₯= 2Β±

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Section 4-7 Mrs. Rivas International Studies Charter School Quadratic Formula 𝒙= βˆ’π’ƒΒ± π’ƒΒ²βˆ’πŸ’π’‚π’„ πŸπ’‚

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Section 4-7 Mrs. Rivas International Studies Charter School Quadratic Formula πŸπ’™Β²βˆ’π’™=πŸ’ Step # 1: Write the equation in standard form. π’š=𝒂𝒙²+𝒃𝒙+𝒄 πŸπ’™Β²βˆ’π’™βˆ’πŸ’=πŸ’βˆ’πŸ’ πŸπ’™Β²βˆ’π’™βˆ’πŸ’=𝟎 Step # 2: Find the values of 𝒂, 𝒃 and 𝒄. 𝒂=𝟐 𝒃=βˆ’πŸ 𝒄=βˆ’πŸ’ 𝒙= βˆ’(βˆ’πŸ)Β± βˆ’πŸ 2 βˆ’πŸ’(𝟐)(βˆ’πŸ’) 𝟐(𝟐) 𝒙= βˆ’π’ƒΒ± π’ƒΒ²βˆ’πŸ’π’‚π’„ πŸπ’‚ Step # 3: Write the quadratic formula and substitute 𝒂, 𝒃 and 𝒄. Step # 4: Simplify. 𝒙= 𝟏± πŸ‘πŸ‘ πŸ’ Answer: 𝟏+ πŸ‘πŸ‘ πŸ’ and πŸβˆ’ πŸ‘πŸ‘ πŸ’

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Section 4-7 Mrs. Rivas International Studies Charter School Quadratic Formula 𝒙²+πŸ”π’™+πŸ—=𝟎 Step # 1: Write the equation in standard form. π’š=𝒂𝒙²+𝒃𝒙+𝒄 𝒄=πŸ— 𝒂=𝟏 𝒃=πŸ” Step # 2: Find the values of 𝒂, 𝒃 and 𝒄. 𝒙= βˆ’(πŸ”)Β± πŸ” 2 βˆ’πŸ’(𝟏)(πŸ—) 𝟐(𝟏) 𝒙= βˆ’π’ƒΒ± π’ƒΒ²βˆ’πŸ’π’‚π’„ πŸπ’‚ Step # 3: Write the quadratic formula and substitute 𝒂, 𝒃 and 𝒄. 𝒙= βˆ’πŸ”Β± 𝟎 𝟐 Step # 4: Simplify. Answer: 𝒙=βˆ’πŸ‘

25 International Studies Charter School
Section 4-7 Mrs. Rivas International Studies Charter School Quadratic Formula 𝒙= βˆ’(πŸ’)Β± πŸ’ 2 βˆ’πŸ’(𝟏)(πŸ’) 𝟐(𝟏) 𝒙= βˆ’(πŸ’)Β± πŸ’ 2 βˆ’πŸ’(𝟏)(βˆ’πŸ‘) 𝟐(𝟏) 𝒙= βˆ’πŸ’Β± πŸπŸ– 𝟐 𝒙= βˆ’πŸ’Β± 𝟎 𝟐 𝒙=βˆ’πŸ 𝒙= βˆ’πŸ’+ πŸπŸ– 𝟐 𝐚𝐧𝐝 𝒙== βˆ’πŸ’βˆ’ πŸπŸ– 𝟐

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Section 4-7 Mrs. Rivas International Studies Charter School Quadratic Formula

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Section 4-7 Mrs. Rivas International Studies Charter School Quadratic Formula

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Section 4-7 Mrs. Rivas International Studies Charter School Quadratic Formula

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Section 4-7 Mrs. Rivas International Studies Charter School Quadratic Formula

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Mrs. Rivas International Studies Charter School Pg. 237 to 239 # 13, 17, 23, 25, 27, 29, 31, 35, 39, 40, 45, 47, 51, 86, 87, 91, 92 Pg , 15, 19, 21, 25, 27, 29, 35, 36

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