Find the value of \(\vec{a}+\vec{b}\)+\(\vec{c}\), if \(\vec{a}\)=4\(\hat{i}\)-4\(\hat{j}\), \(\vec{b}\)=-3\(\hat{i}\)+2k, \(\vec{c}\)=7\(\hat{j}\)-8\(\hat{k}\).(a) \(\hat{i}\)-3\(\hat{j}\)(b) \(\hat{i}\)+3\(\hat{j}\)-6\(\hat{k}\)(c) \(\hat{i}\)+\(\hat{j}\)+6\(\hat{k}\)(d) \(\hat{i}\)+6\(\hat{k}\)I had been asked this question during an online exam.I'm obligated to ask this question of Addition of Vectors in portion Vector Algebra of Mathematics – Class 12

Find the value of \(\vec{a}+\vec{b}\)+\(\vec{c}\), if \(\vec{a}\)=4\(\

1.	Find the value of \(\vec{a}+\vec{b}\)+\(\vec{c}\), if \(\vec{a}\)=4\(\hat{i}\)-4\(\hat{j}\), \(\vec{b}\)=-3\(\hat{i}\)+2k, \(\vec{c}\)=7\(\hat{j}\)-8\(\hat{k}\).(a) \(\hat{i}\)-3\(\hat{j}\)(b) \(\hat{i}\)+3\(\hat{j}\)-6\(\hat{k}\)(c) \(\hat{i}\)+\(\hat{j}\)+6\(\hat{k}\)(d) \(\hat{i}\)+6\(\hat{k}\)I had been asked this question during an online exam.I'm obligated to ask this question of Addition of Vectors in portion Vector Algebra of Mathematics – Class 12
Answer» The correct option is (b) \(\HAT{i}\)+3\(\hat{j}\)-6\(\hat{k}\) For explanation: GIVEN that, \(\vec{a}\)=4\(\hat{i}\)-4\(\hat{j}\), \(\vec{b}\)=-3\(\hat{i}\)+2K, \(\vec{c}\)=7\(\hat{j}\)-8\(\hat{k}\) To FIND: \(\vec{a}+\vec{b}\)+\(\vec{c}\) ∴\(\vec{a}+\vec{b}\)+\(\vec{c}\)=(4\(\hat{i}\)-4\(\hat{j}\)) +(-3\(\hat{i}\)+2k) +(7\(\hat{j}\)-8\(\hat{k}\)) =(4-3) \(\hat{i}\)+(-4+7) \(\hat{j}\)+(2-8)\(\hat{k}\) =\(\hat{i}\)+3\(\hat{j}\)-6\(\hat{k}\)

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