6/34 = D/68
Answer:
129
Step-by-step explanation:
If you are finding the answer of the hole thing you need to add 49+90
3х – 5у = -4
solve the system of linear equation by substitution
The square can be constructed by making perpendicular on vertex A and B. Then cut an arcs and obtain the points C and D and construct perpendicular on point C and D and get ABCD is required square.
Further Explanation:
Square is a 4 sided close figure.
Square has all sides equal and all angles are of .
The all sides of the square are perpendicular to each other.
Given:
A line segment AB.
Construction:
Steps involve in constructing a square from a line segment AB are as follows.
1. Draw a line segment AB.
2. Construct perpendicular AX at point A and then construct another perpendicular BY at point B.
3. Cut an arc on perpendicular line from A at point C that is equal to the length equal to side AB
4. Cut an arc on perpendicular line from B at point D that is equal to the length equal to side AB
5. Construct perpendicular at point C and then construct another perpendicular at point D.
6. The perpendicular intersects each other at point C and D.
The required square is ABCD is shown in figure attached.
Kindly refer to the image attached.
Learn more:
1. Learn more about inverse of the function brainly.com/question/1632445.
2. Learn more about equation of circle brainly.com/question/1506955.
3. Learn more about range and domain of the function brainly.com/question/3412497
Answer details:
Grade: Middle School
Subject: Mathematics
Chapter: Construction
Keywords: square, perpendicular, , intersect, construct, line, line segment, point, right angle, sides, close figure, arc, length.
1. Extend the segment AB twice left and twice right. Let the point that lies left be D and the point that lies right be C. Then AD=AB=BC.
2. Draw the circles with center at points D and B and congruent radii that are greater than AB. Denote two points of their intersection as E and F.
3. Combine points E and F. The segment EF is perpendicular to the segment AB and passes through the point A.
4. Draw the circles with center at points C and A and congruent radii that are greater than AB. Denote two points of their intersection as K and L.
5. Combine points K and L. The segment KL is perpendicular to the segment AB and passes through the point B.
6. Postpone on the segment EF point X such that AX=AB and on the segment KL point Y, such that BY=AB and X and Y lie for the same side.
7. Combine points X and Y. ABYX is required square.
find f(3).
Answer:
See below.
Step-by-step explanation:
f(3) means the y-coordinate of the point that has x-coordinate 3.
To find f(3) using a graph of f(x).
Look up x = 3 on the x axis. If the function passes through that point on the x-axis, then f(3) is 0. If the function does not pass through that point, then go up or down till you intersect the function. Draw a horizontal segment left to the y-axis and read the point on the y-axis that the horizontal segment intersects. That is what f(3) is equal to.
Answer:
Sample Response: For f(3), the input is 3 and you are looking for the output. To determine the function's value when x = 3, go to the value of 3 on the x-axis and then locate the graph for that value of x. Determine the value of y from the y-axis at that location on the graph.
Step-by-step explanation:
answer on edge