Find the zeros of the polynomial 4u 2+8u
WebApr 2, 2024 · Also, the Product of zeroes in any quadratic polynomial equation is given by = constant term / coeff.of x 2 = −3/6 = −1/2. Hence, the relationship is verified. (iv) 4u2 + 8u. 4u2 + 8u = 4u (u+2) Clearly, for finding the zeroes of the above quadratic polynomial equation either: – 4u=0 or u+2=0 WebIn this series of video lessons by Mathetonic we shall learn: 1. What a polynomial is. 2. Types of polynomials on basis of degree and number of terms. 3. Find zeroes of …
Find the zeros of the polynomial 4u 2+8u
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WebFind the zeroes of the following quadratic polynomials and verify the relationship between the zeroes and the coefficients. (iii) 4u² + 8u. (iv) 4u² + 8u. Factorize the equation. … WebFeb 10, 2024 · In this series of video lessons by Mathetonic we shall learn: 1. What a polynomial is. 2. Types of polynomials on basis of degree and number of terms. 3. Find zeroes of polynomials …
WebThe zeros of the quadratic equation are represented by the symbols α, and β. For a quadratic equation of the form ax 2 + bx + c = 0 with the coefficient a, b, constant term c, … WebSolution Verified by Toppr Let f(u)=4u 2+8u To calculate the zeros of the given equation, put f(u)=0. 4u 2+8u=0 4u(u+2)=0 u=0,u=−2 The zeros of the given equation is 0 and −2. …
WebMar 10, 2024 · Best answer Given polynomial is 4u2 + 8u We have, 4u2 + 8u = 4u (u + 2) The value of 4u2 + 8u is 0, when the value of 4u (u + 2) = 0, i.e., when u = 0 or u + 2 = 0, i.e., when u = 0 (or) u = – 2 ∴ The zeroes of 4u2 + 8u are 0 and – 2. Therefore, sum of the zeroes = 0 + (-2) = -2 WebFind the zeros of the polynomial f (u) = 4u + 8u, and verify the relationship between the zeros and its coefficients. Question Transcribed Image Text: Find the zeros of the polynomial f (u) = 4u + 8u, and verify the relationship between the zeros and its coefficients. Expert Solution Want to see the full answer? Check out a sample Q&A here
Web(iv) 4u 2 + 8u (v) t 2 - 15 (vi) 3x 2 - x - 4 Solution: We know that the standard form of the quadratic equation is: ax 2 + bx + c = 0 Simplify the quadratic polynomial by factorization and find the zeroes of the polynomial. Now we have to find the relation between the zeroes and the coefficients.
WebApr 28, 2024 · find the zeros of the quadratic polynomial 4u2+8u Find the zeros of 4u^2+8u Ex 2.2 Class 10 Q1 - YouTube 0:00 / 3:10 find the zeros of the quadratic … excel countifs greater than cellWebApr 4, 2024 · Find the zeroes of the quadratic polynomial 4u^2 + 8u and verify the relationship between the zeroes - YouTube CLASS-10TH MATHEMATICS POLYNOMIALS CBSE Find the … excel countifs length greater than 1WebMar 29, 2024 · (iv) 4u2 + 8u Let p (u) = 4u2 + 8u Zero of the polynomial is the value of u where p (u) = 0 Putting p (u) = 0 4u2 + 8u = 0 4u (u + 2) = 0 u (u + 2) = 0/4 u (u + 2) = 0 … Ex 2.2, 1Find the zeroes of the following quadratic polynomials and verify the … excel countifs greater than another cellWeb4u 2 + 8u = 4u(u + 2) = 4[u - 0][u - (-2)] The zeroes of the polynomial are {0, 2} Relationship between the zeroes and the coefficients of the polynomial. Sum of the zeroes =`4 -2=2 =-(-2)/1=-("coefficient of " x)/("coefficient of " x^2)` Also product of the zeroes =` 4 xx - 2 =-8=(-8)/1="constant term"/("coefficient of " x^2)` Hence verified bryher boatsWebFind the zeros of the quadratic polynomial 4u2+8u and verify the relationship between the zeros and the coefficient Solution Suggest Corrections 50 Similar questions Q. Question … excel countif shaded cellWebThus, x = 3/2, - 1/3 are the zeroes of the polynomial. (iv) 4u 2 + 8u. 4u(u + 2) = 0. u = 0, u = - 2 are the zeroes of the polynomial. Thus, α = 0 and β = - 2. Now, let's find the … bryher headboardWebThe zeros of the quadratic equation are represented by the symbols α, and β. For a quadratic equation of the form ax 2 + bx + c = 0 with the coefficient a, b, constant term c, the sum and product of zeros of the polynomial are as follows. Sum of Zeros of Polynomial = α + β = -b/a = - coefficient of x/coefficient of x 2. excel countifs greater than or equal to