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1 year ago

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Find the magnitude of wx for w(-3 5 4) and x(9 5 3)

2 answers:

Mariulka [41]1 year ago

6 0

Answer:

Magnitude = $\sqrt({145)$ .

Step-by-step explanation:

Given : wx for w(-3 5 4) and x(9 5 3).

To find : find the magnitude of wx .

Solution : We have given that w(-3 5 4) and x(9 5 3).

Magnitude = $\sqrt({x_{2} -x_{1} )^{2}+({y_{2} -y_{1} )^{2} +({z_{2} -z_{1})^{2}$ .

$x_{1}= -3$ , $x_{2} = 9$ , $y_{1} = 5$ , $y_{2} = 5$ , $z_{1} = 4$ , $z_{2} = 3$ .

Plugging the values in above formula ,

Magnitude = $\sqrt({9 - (-3))^{2}+({5-5 )^{2} +({3 -4)^{2}$ .

Magnitude = $\sqrt({12)^{2}+({0 )^{2} +({-1^{2}$ .

Magnitude = $\sqrt({144+0+1)$ .

Magnitude = $\sqrt({145)$ .

Therefore, Magnitude = $\sqrt({145)$ .

Hatshy [7]1 year ago

3 0

Answer: Magnitude of wx is $\sqrt{145}$

Step-by-step explanation:

Since we have given that

$w(-3,5,4)=-3\hat{i}+5\hat{j}+4\hat{k}\\\\x(9,5,3)=9\hat{i}+5\hat{j}+3\hat{k}$

Now, first we will find 'wx':

$wx=Initial-Final\\\\wx=(9+3)\hat{i}+(5-5)\hat{j}+(3-4)\hat{k}\\\\wx=12\hat{i}-1\hat{k}$

We need to find the "magnitude":

$\mid wx\mid=\sqrt{12^2+1^2}=\sqrt{144+1}=\sqrt{145}$

Hence, Magnitude of wx is $\sqrt{145}$

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$M=k\int^{9}_{1}\frac{y^{3}}{3}|^{4}_{1}dx$

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$(\bar{x},\bar{y})=(5,\frac{85}{28})$

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The correct question is
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