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Semelhante a Solving quadratic equations using the quadratic formula
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Solving quadratic equations using the quadratic formula
- 1. SOLVING QUADRATIC EQUATIONS USING THE QUADRATIC FORMULA BY L.D.
- 2. TABLE OF CONTENTS • Slide 3: Formula • Slide 4: Solve 2x2 – 5x – 3 = 0 • Slide 10: Solve 2x2 + 7x = 9 • Slide 13: Solve x2 + x – 1 = 0
- 3. FORMULA The Quadratic Formula: We start with a problem structured like ax2 + bx + c = 0, then we use the a, b & c from that format in ournew formula: x = -b ± √b2 – 4ac 2a
- 4. PROBLEM 1 • Solve the equation 2x2 – 5x – 3 = 0
- 5. PROBLEM 1 Formula • Solve the equation ax2 + bx + c = 0 2x2 – 5x – 3 = 0 to The first thing we need to do is to x = -b ± √b – 4ac 2 2a see if this fits the first formula. It does since it has the variable squared, the coefficient and the constant all equaling to zero.
- 6. PROBLEM 1 Formula • Solve the equation ax2 + bx + c = 0 2x2 – 5x – 3 = 0 to Next we find the a, b & c and put x = -b ± √b – 4ac 2 2a them into the second formula. To find them we just match up the places they are in formula one to the places we have in our problem. By doing this we discover that a=2 b = -5 c = -3
- 7. PROBLEM 1 • Solve the equation Formula ax2 + bx + c = 0 2x2 – 5x – 3 = 0 to a=2 b = -5 c = -3 x = -b ± √b2 – 4ac 2a Now that we have these, we can place them in our second formula. x = -(-5) ± √(-5)2 – 4(2)(-3) 2(2)
- 8. PROBLEM 1 Now we solve the equation we made! x=5+7 x = -(-5) ± √(-5)2 – 4(2)(-3) 4 2(2) x = 12 x = 5± √25 + 24 or x = 3 4 4 x = 5 ± √49 x=5-7 4 4 x = -2 x=5±7 4 or x = -1/2 4
- 9. PROBLEM 2 • Solve 2x2 + 7x = 9
- 10. PROBLEM 2 Formula • Solve 2x2 + 7x = 9 ax2 + bx + c = 0 So first we reorder it! to 2x2 + 7x = 9 x = -b ± √b2 – 4ac 2a -9 -9 2x2 + 7x – 9 = 0
- 11. PROBLEM 2 2x2 + 7x – 9 = 0 Formula ax2 + bx + c = 0 Now we identify the a, b & c and to place it in formula two. Then we solve. x = -b ± √b2 – 4ac 2a x = -(7) ± √(7)2 – 4(2)(-9) 2(2) x = -7 ± √49 – (- 72) x = -7 ± 11 4 x = -7 ± √121 4 4
- 12. PROBLEM 2 x = -7 ± 11 4 x = -7 + 11 x = -7 - 11 4 4 x= 4 x = -18 or x = 1 or x = -9/2 4 4
- 13. PROBLEM 3 • Solve x2 + x – 1 = 0
- 14. PROBLEM 3 Formula • Solve x2 + x – 1 = 0 ax2 + bx + c = 0 First we need to identify a, b & c to x = -b ± √b2 – 4ac a=1 b=1 c = -1 2a Next we need to put them in our problem and solve. x = -(1) ± √(1)2 – 4(1)(-1) 2(1)
- 15. PROBLEM 3 x = -(1) ± √(1)2 – 4(1)(-1) 2(1) x = -1 ± √1+ 4 2 We can go no= -1 ± √5 x further since 5 can’t 2 be squared. x = -1 + √5 x = -1 - √5 2 2