Expand the expression $(2x - 3)^6$.
Using the Binomial Theorem,the expansion of $(a + b)^n$ is given by $\sum_{k=0}^{n} {^nC_k} a^{n-k} b^k$.
For the expression $(2x - 3)^6$,we have $a = 2x$,$b = -3$,and $n = 6$.
$(2x - 3)^6 = {^6C_0}(2x)^6(-3)^0 + {^6C_1}(2x)^5(-3)^1 + {^6C_2}(2x)^4(-3)^2 + {^6C_3}(2x)^3(-3)^3 + {^6C_4}(2x)^2(-3)^4 + {^6C_5}(2x)^1(-3)^5 + {^6C_6}(2x)^0(-3)^6$
$= 1(64x^6)(1) + 6(32x^5)(-3) + 15(16x^4)(9) + 20(8x^3)(-27) + 15(4x^2)(81) + 6(2x)(-243) + 1(1)(729)$
$= 64x^6 - 576x^5 + 2160x^4 - 4320x^3 + 4860x^2 - 2916x + 729$.
For the expression $(2x - 3)^6$,we have $a = 2x$,$b = -3$,and $n = 6$.
$(2x - 3)^6 = {^6C_0}(2x)^6(-3)^0 + {^6C_1}(2x)^5(-3)^1 + {^6C_2}(2x)^4(-3)^2 + {^6C_3}(2x)^3(-3)^3 + {^6C_4}(2x)^2(-3)^4 + {^6C_5}(2x)^1(-3)^5 + {^6C_6}(2x)^0(-3)^6$
$= 1(64x^6)(1) + 6(32x^5)(-3) + 15(16x^4)(9) + 20(8x^3)(-27) + 15(4x^2)(81) + 6(2x)(-243) + 1(1)(729)$
$= 64x^6 - 576x^5 + 2160x^4 - 4320x^3 + 4860x^2 - 2916x + 729$.
Explore More
Similar Questions
Let $x = (8 \sqrt{3} + 13)^{13}$ and $y = (7 \sqrt{2} + 9)^9$. If $[t]$ denotes the greatest integer $\leq t$,then:
DifficultJEE MAIN 2023
View SolutionIf $(1+2x+3x^2)^{10} = a_0+a_1x+a_2x^2+\ldots+a_{20}x^{20}$,then $\frac{a_2}{a_1}$ is equal to
Find the value of $(a^{2}+\sqrt{a^{2}-1})^{4}+(a^{2}-\sqrt{a^{2}-1})^{4}$.
Difficult
View SolutionIn the expansion of $(1 + x)^5$,the sum of the coefficients of the terms is
Easy
View SolutionVedclass Products
For Students
Vedclass Test Series
Mock tests in real JEE/NEET style with performance analysis. 5-day free trial.
Start Free TrialFor Teachers
Exam Paper Generator
Generate Set A/B/C/D exam papers from 7.5L+ questions in 2 minutes. 3 chapters free.
Try FreeFor Institutes
Online Exam Module
Live online exams with unlimited students, 360° analytics & white-label branding.
See Demo