Given : (1+5x-7x³)²⁰²⁰ To Find : sum of the co-efficients in the expansion Solution: P(x) = (1+5x-7x³)²⁰²⁰ => P(x) = 1 + coefficient and terms with power of x if we put x = 1 => P(1) + 1 + sum of other coefficient => P(1) = sum of other coefficient P(1) = (1+5-7)²⁰²⁰ = (-1)²⁰²⁰ = ((-1)²)¹⁰¹⁰ = 1¹⁰¹⁰ = 1 The sum of the co-efficients in the expansion of (1+5x-7x^3) ^2020 is 1 Learn More: The first three terms in the binomial expansion of ( ) n x y + are 1, 56 … brainly.in/question/13197893 evaluate (2+√3)^7 + (2 – √3)^7 by binomial theorem brainly.in/question/5256736 Use binomial theorem to expand (2+X)5 in ascending powers of x … brainly.in/question/11212431 Reply
Step-by-step explanation: Given: [tex]( {1 + 5x – 7 {x}^{3} )}^{2020} \\ [/tex] To find: Sum of coefficients in the given expansion Solution: To find Sum of coefficients in the given expansion put x=1 [tex]( {1 + 5(1) – 7( {1}^{3})) }^{2020} \\ \\ [/tex] Now,solve [tex] = > ( {1 + 5 – 7)}^{2020} \\ \\ = > {(6 – 7)}^{2020} \\ \\ = > {( – 1)}^{2020} \\ \\ = > 1 \\ \\ [/tex] Because 2020 is even number. we know that when power is even and base is negative,then result is positive. Final Answer:Sum of coefficients in the expansion of [tex]\bold{( {1 + 5x – 7 {x}^{3} )}^{2020}} \\ [/tex] is 1. Hope it helps you. To learn more on brainly: The sum of coefficients in the expansion of (1-2x+5x^2)^n is a and the sum of the coefficients in the expansion of (1-x)… https://brainly.in/question/6310657 Reply
Given : (1+5x-7x³)²⁰²⁰
To Find : sum of the co-efficients in the expansion
Solution:
P(x) = (1+5x-7x³)²⁰²⁰
=> P(x) = 1 + coefficient and terms with power of x
if we put x = 1
=> P(1) + 1 + sum of other coefficient
=> P(1) = sum of other coefficient
P(1) = (1+5-7)²⁰²⁰ = (-1)²⁰²⁰
= ((-1)²)¹⁰¹⁰
= 1¹⁰¹⁰
= 1
The sum of the co-efficients in the expansion of (1+5x-7x^3) ^2020 is 1
Learn More:
The first three terms in the binomial expansion of ( ) n x y + are 1, 56 …
brainly.in/question/13197893
evaluate (2+√3)^7 + (2 – √3)^7 by binomial theorem
brainly.in/question/5256736
Use binomial theorem to expand (2+X)5 in ascending powers of x …
brainly.in/question/11212431
Step-by-step explanation:
Given:
[tex]( {1 + 5x – 7 {x}^{3} )}^{2020} \\ [/tex]
To find: Sum of coefficients in the given expansion
Solution:
To find Sum of coefficients in the given expansion put x=1
[tex]( {1 + 5(1) – 7( {1}^{3})) }^{2020} \\ \\ [/tex]
Now,solve
[tex] = > ( {1 + 5 – 7)}^{2020} \\ \\ = > {(6 – 7)}^{2020} \\ \\ = > {( – 1)}^{2020} \\ \\ = > 1 \\ \\ [/tex]
Because 2020 is even number.
we know that when power is even and base is negative,then result is positive.
Final Answer:Sum of coefficients in the expansion of
[tex]\bold{( {1 + 5x – 7 {x}^{3} )}^{2020}} \\ [/tex]
is 1.
Hope it helps you.
To learn more on brainly:
The sum of coefficients in the expansion of (1-2x+5x^2)^n is a and the sum of the coefficients in the expansion of (1-x)…
https://brainly.in/question/6310657