In order to ensure success, health, hygiene, happiness, and longevity on this planet, we need to develop an attitude on positive thinking. It is a tool in our hands to enjoy a rewarding life. You are Ankur of Nodia Public School, Nodia. Write a speech to be delivered in the morning assemble of our school on the advantages of developing a positive attitude.
Answers
Explanation:
Giventhat...Giventhat...
{\green{\bigstar}}★ A quadratic equation is given as {\red{\sf{2x^{2} - 5x + 3 = 0}}}2x2−5x+3=0
{\large{\pmb{\sf{\underline{To \; find...}}}}}Tofind...Tofind...
{\green{\bigstar}}★ Determine the nature of the root of the given quadratic equation.
{\large{\pmb{\sf{\underline{Solution...}}}}}Solution...Solution...
{\green{\bigstar}}★ The nature of the root of the quadratic equation {\red{\sf{2x^{2} - 5x + 3 = 0}}}2x2−5x+3=0 is {\red{\sf{Real}}}Real and {\red{\sf{Equal}}}Equal
{\large{\pmb{\sf{\underline{Knowledge...}}}}}Knowledge...Knowledge...
Some knowledge about Quadratic Equations -
★ Sum of zeros of any quadratic equation is given by ➝ α+β = -b/a
★ Product of zeros of any quadratic equation is given by ➝ αβ = c/a
★ Discriminant is given by b²-4ac
Discriminant tell us about there are solution of a quadratic equation as no solution, one solution and two solutions.
★ A quadratic equation have 2 roots
★ ax² + bx + c = 0 is the general form of quadratic equation
⠀⠀⠀⠀━━━━━━━━━━━━━━━━━━
{\large{\pmb{\sf{\underline{Using \; concepts...}}}}}Usingconcepts...Usingconcepts...
{\red{\bigstar}}★ Discriminant is given by the given:
{\small{\underline{\boxed{\sf{b^{2} - 4ac}}}}}b2−4ac
{\large{\pmb{\sf{\underline{Full \; Solution...}}}}}FullSolution...FullSolution...
{\small{\underline{\boxed{\sf{b^{2} - 4ac}}}}}b2−4ac
{\sf{:\implies b^{2} - 4ac}}:⟹b2−4ac
{\sf{:\implies Given \: that \: = 2x^{2} - 5x + 3 = 0}}:⟹Giventhat=2x2−5x+3=0
{\sf{:\implies (-5)^{2} - 4(2)(3)}}:⟹(−5)2−4(2)(3)
{\sf{:\implies -5 \times -5 - 4(2)(3)}}:⟹−5×−5−4(2)(3)
{\sf{:\implies 5 \times 5 - 4(2)(3)}}:⟹5×5−4(2)(3)
{\sf{:\implies 25 - 4(2)(3)}}:⟹25−4(2)(3)
{\sf{:\implies 25 - 4(6)}}:⟹25−4(6)
{\sf{:\implies 25 - 4 \times 6}}:⟹25−4×6
{\sf{:\implies 25 - 24}}:⟹25−24
{\sf{:\implies 1}}:⟹1
Henceforth, the discriminant is 1. Therefore, the nature of the root of the given quadratic equation is Equal and Real.