QUESTION IMAGE
Question
- given the following vector: $mathbf{p} = -2mathbf{i} + 4mathbf{j}$ , find $5mathbf{p}$.
- given the following vectors: $mathbf{r} = < 3, -4 >$ and $mathbf{s} = < -4, -2 >$ , find $2mathbf{r} - 6mathbf{s}$.
Step1: Multiplicar vector p por 5
$5\mathbf{p} = 5(-2\mathbf{i} + 4\mathbf{j})$
$5\mathbf{p} = 5(-2)\mathbf{i} + 5(4)\mathbf{j}$
$5\mathbf{p} = -10\mathbf{i} + 20\mathbf{j}$
Step2: Calcular 2r para el segundo problema
$2\mathbf{r} = 2\langle 3, -4
angle$
$2\mathbf{r} = \langle 2(3), 2(-4)
angle = \langle 6, -8
angle$
Step3: Calcular 6s para el segundo problema
$6\mathbf{s} = 6\langle -4, -2
angle$
$6\mathbf{s} = \langle 6(-4), 6(-2)
angle = \langle -24, -12
angle$
Step4: Restar 6s a 2r
$2\mathbf{r} - 6\mathbf{s} = \langle 6 - (-24), -8 - (-12)
angle$
$2\mathbf{r} - 6\mathbf{s} = \langle 6 + 24, -8 + 12
angle = \langle 30, 4
angle$
Snap & solve any problem in the app
Get step-by-step solutions on Sovi AI
Photo-based solutions with guided steps
Explore more problems and detailed explanations
- $-10\mathbf{i} + 20\mathbf{j}$
- $\langle 30, 4
angle$