QuestionIn triangle , find , coordinates of , values of and , and ratio . Points: , , , .
Studdy Solution
STEP 1
Assumptions1. Triangle is a right-angled triangle.
. The coordinates of point are .
3. The coordinates of point are .
4. The coordinates of point are .
5. The coordinates of point are $(p,1)$.
6. The line $AC$ intersects the $y$-axis at $Q$ such that $AQ=QC$.
7. Point lies on line and is perpendicular to .
STEP 2
Since is perpendicular to , the slopes of and are negative reciprocals of each other. Let's find the slope of .
STEP 3
The slope of is the negative reciprocal of the slope of .
STEP 4
We can also find the slope of using the coordinates of and .
STEP 5
Setting the two expressions for equal to each other, we can solve for .
STEP 6
olving for gives us
STEP 7
Since , the -coordinate of is (as it lies on the -axis) and the -coordinate of is the average of the -coordinates of and .
So, .
STEP 8
Substituting into the equation from6, we can solve for .
STEP 9
We can find the equation of line using the point-slope form of the equation of a line, , where is the slope and is a point on the line.
STEP 10
Substituting and solving for gives us .
STEP 11
The ratio is equal to the ratio of the distances from to to .
APPB = \frac{\sqrt{(- - (-15))^ + (7 -)^}}{\sqrt{(-15 - (-9))^ + ( -9)^}} = \frac{\sqrt{9 +36}}{\sqrt{36 +64}} = \frac{\sqrt{45}}{\sqrt{100}} = \frac{3}{}(a) The value of is .
(b) The coordinates of are .
(c) The values of and are and , respectively.
(d) The ratio is .
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