Question13 Diberi segi tiga dengan dan berada pada garis dengan keadaan . It is given that a triangle with . T lies on the line such that . (a) Cari vektor Find the vector (i) , (ii) . Seterusnya, car1 vektor unit dalam arah . . Hence, find the unit vector in the direction of . [5 markah] [5 marks] (b) Jika ialah satu titik dengan keadaan dan , dengan keadaan dan adalah pemalar. Cari nilai dan nilai . If is a point such that and , such that and are constants. Find the value of and of .
Studdy Solution
STEP 1
What is this asking?
We're given two sides of a triangle as vectors, and a point on the third side with a specific ratio.
We need to find some other vectors and a unit vector.
Then, we're given another point and its vector related to the third side of the triangle, and we need to find some constants.
Watch out!
Vector addition and subtraction can be tricky!
Remember, it's tip minus tail.
Also, don't forget to normalize your unit vector!
STEP 2
1. Find BC
2. Find AT and its unit vector
3. Find h and k
STEP 3
Alright, let's **start** by finding !
We know that .
Remember, it's tip minus tail, so is the opposite of .
STEP 4
So, .
STEP 5
Now, add the vectors: .
So, !
STEP 6
We're given that .
This means is one-fourth of since the segments are in a 1:3 ratio.
So, .
STEP 7
Now, let's find .
We know .
Substituting our known vectors: .
STEP 8
To find the **unit vector**, we need to divide by its magnitude.
The magnitude of is .
STEP 9
The unit vector in the direction of is .
STEP 10
We're given and .
We already found .
STEP 11
So, .
This means .
STEP 12
By comparing the coefficients of , we have , so .
STEP 13
Comparing the coefficients of , we have .
Since , we have .
STEP 14
(a)(i)
(a)(ii) .
The unit vector is .
(b) and .
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