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mohon bantuannya kak no 4,5,6​

Berikut ini adalah pertanyaan dari daaaaa19 pada mata pelajaran Matematika untuk jenjang Sekolah Menengah Atas

Mohon bantuannya kak

no 4,5,6​
mohon bantuannya kak no 4,5,6​

Jawaban dan Penjelasan

Berikut ini adalah pilihan jawaban terbaik dari pertanyaan diatas.

\purple{\huge{4.}}

\sf \overrightarrow{AB}=((-4-3)~,~(-2-(-1))~,~(0-4))

\sf \overrightarrow{AB}=(-7~,~-1~,~-4)

\sf \left|\overrightarrow{AB}\right|=\sqrt{(-7)^2+(-1)^2+(-4)^2}\sf =\sqrt{49+1+16}\sf =\sqrt{66}

\sf \overrightarrow{AC}=((3-3)~,~(-2-(-1))~,~(1-4))

\sf \overrightarrow{AC}=(0~,~-1~,~-3)

\sf \left|\overrightarrow{AC}\right|=\sqrt{0^2+(-1)^2+(-3)^2}\sf =\sqrt{0+1+9}\sf =\sqrt{10}

[tex]\sf \overrightarrow{AB}.\overrightarrow{AC}=(-7\times 0)+(-1\times -1)+(-4\times -3)\sf =0+1+12\sf =13

\sf cos~\angle~BAC=\frac{\overrightarrow{AB}.\overrightarrow{AC}}{\left|\overrightarrow{AB}\right|\times \left|\overrightarrow{AC}\right|}

\sf cos~\angle~BAC=\frac{13}{\sqrt{66}\times \sqrt{10}}=\frac{13}{\sqrt{660}}\sf \approx 0,506

\sf \angle~BAC\approxarc.\sf cos~0,506

\red{\huge{\sf \angle~BAC\approx 60\degree}}

\\

\purple{\huge{5.}}

\sf cos~\frac{\pi}{6}=\frac{\vec{a}.\vec{b}}{\sqrt{3}\times 1}

\vec{a}.\vec{b}\sf ~=\sqrt{3}\times \frac{1}{2}\sqrt{3}

\vec{a}.\vec{b}\sf ~=\frac{3}{2}

\left|\vec{a}+\vec{b}\right|=\sqrt{\left|\vec{a}\right|^2+\left|\vec{b}\right|^2+2\times \left|\vec{a}\right|\times \left|\vec{b}\right|\times \sf cos~\frac{\pi}{6}}

\left|\vec{a}+\vec{b}\right|=\sqrt{\left(\sqrt{3}\right)^2+1^2+2\times \sqrt{3}\times 1\times \frac{1}{2}\sqrt{3}}=\sqrt{3+1+2\times \frac{3}{2}}=\sqrt{3+1+3}

\left|\vec{a}+\vec{b}\right|=\sqrt{7}

\left|\vec{a}-\vec{b}\right|=\sqrt{\left|\vec{a}\right|^2+\left|\vec{b}\right|^2-2\times \left|\vec{a}\right|\times \left|\vec{b}\right|\times \sf cos~\frac{\pi}{6}}=\sqrt{\left(\sqrt{3}\right)^2+1^2-2\times \sqrt{3}\times 1\times \frac{1}{2}\sqrt{3}}=\sqrt{3+1-2\times \frac{3}{2}}=\sqrt{3+1-3}

\left|\vec{a}-\vec{b}\right|=1

\left(\vec{a}+\vec{b}\right).\left(\vec{a}-\vec{b}\right)=\left|\vec{a}\right|^2-\left|\vec{b}\right|^2=\left(\sqrt{3}\right)^2-1^2

\left(\vec{a}+\vec{b}\right).\left(\vec{a}-\vec{b}\right)=2

Jika dimisalkan sudut antara vektor \left(\vec{a}+\vec{b}\right)dan vektor\left(\vec{a}-\vec{b}\right)adalah\beta, maka :

\sf cos~\beta=\frac{\left(\vec{a}+\vec{b}\right).\left(\vec{a}-\vec{b}\right)}{\left|\vec{a}+\vec{b}\right|\times \left|\vec{a}-\vec{b}\right|}

\sf cos~\beta=\frac{2}{\sqrt{7}\times 1}

\red{\huge{\sf cos~\beta=\frac{2}{7}\sqrt{7}}}

\\

\purple{\huge{6.}}

Dimisalkan sudut antara vektor \vec{a}dan vektor\vec{b}adalah\alpha, maka :

\sf cos~\alpha=\frac{\vec{a}.\vec{b}}{\left|\vec{a}\right|\times \left|\vec{b}\right|}

\sf cos~\frac{\pi}{3}=\frac{(2\times 1)+(-1\times 3)+(3\times -\it{p}\sf ~)}{\sqrt{2^2+(-1)^2+3^2}\times \sqrt{1^2+3^2+(-\it{p}\sf ~)^2}}

\sf \frac{1}{2}=\frac{2-3-3\it{p}}{\sqrt{4+1+9}\times \sqrt{1+9+\it{p}\sf ~^2}}

\sf \frac{1}{2}=\frac{-1-3\it{p}}{\sqrt{14}\times \sqrt{10+\it{p}\sf ~^2}}

\sf \frac{1}{2}=\frac{-1-3\it{p}}{\sqrt{14\times \left(10+\it{p}\sf ~^2\right)}}

\sf \frac{1}{2}=\frac{-1-3\it{p}}{\sqrt{140+14\it{p}\sf ~^2}}

\sf \sqrt{140+14\it{p}\sf ~^2}=2(-1-3\it{p}\sf ~)

\sf \sqrt{14\it{p}\sf ~^2+140}=-2-6\it{p}

\sf \left(\sqrt{14\it{p}\sf ~^2+140}\right)^2=(-2-6\it{p}\sf ~)^2

\sf 14\it{p}\sf ~^2+140=36\it{p}\sf ~^2+24\it{p}\sf ~+4

\sf 36\it{p}\sf ~^2-14\it{p}\sf ~^2+24\it{p}\sf ~+4-140=0

\sf 22\it{p}\sf ~^2+24\it{p}\sf ~-136=0

\sf 11\it{p}\sf ~^2+12\it{p}\sf ~-68=0

(11p+34)(p-2)=0

\red{\huge{p=-\frac{34}{11}}}~~atau~~\red{\huge{p=2}}

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Last Update: Sat, 31 Jul 21
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