Draw the graph of 2x - y -1 = 0 and 2x + y = 9 on the same
axes. Use 2cm = 1 unit on both axes? Write down the co-ordinates
of the point of Intersection of the two lines.
Answers
Answer:
hdmi as daawwjejdjdiej hehejie
Step-by-step explanation:
Jiskha Homework Help
Ask a New Question
Questions
calculus
Determine the largest rectangle that can be inscribed inside the cavities of the two curves:
y = –2(x – 6)2
&
y = 6x2 –12*Tx – 128 + 6*T2
Alex
Dec 16, 2012
check your typing, where do the T's come from all of a sudden in the second equation ?
is the first one the parabola
y = -2(x-6)^2 ?
Reiny
Dec 16, 2012
Respond to this Question
First Name
Your Response
Similar Questions
alg 2
a rectangle is to be inscribed in a isosceles triangle of height 8 and base 10. Find the greatest area of such rectangle.
calculus
find the area of the largest rectangle having one side on the x axis and inscribed in the triangle formed by the lines y=x, y=0, and 3x + y = 20
AP Calculus
A rectangle is inscribed between the parabolas y=4x^2 and y=30-x^2. what is the maximum area of such a rectangle? a)20root2 b)40 c)30root2 d)50 e)40root2
Calculus
"A rectangle is inscribed in a semicircle of radius 2 cm. Find the largest area of such a rectangle". There is a diagram, but I think the question makes it clear enough what is going on. I'm having problems finding a relationship
calculus
A rectangle with its base on the x-axis is to be inscribed under the graph of y=2-x^2. Find the height of the rectangle if the area is the largest possible area. (Round to the nearest hundreth)
Calculus
4. Find the area of the largest rectangle (with sides parallel to the coordinate axes) that can be inscribed in the region enclosed by the graphs of f(x) = 18 – x^2 and g(x) = 2x^2 – 9.
Calculus
Find the area of the largest rectangle with sides parallel to the coordinate axes which can be inscribed in the area bounded by the two parabolas y=26-x^2 and y=x^2+2
Math
The first question is this: Helen designs a rectangle with an area of 225 square units. Her rectangle is the largest rectangle (that is, with largest area) with whole-number side lengths that can be made from the perimeter of the
Calculus
A rectangle is to be inscribed under the curve y=4cos(.5x). The rectangle is to be inscribed from x=0 to x=pi. Find the dimensions that give max area and what is the max area.
maths
Find the area of the largest rectangle that can be inscribed in a semicircle of radius "r"?
maths
The given figure shows a rectangle inscribed in an isosceles right triangle whose hypotenuse is10 units long. Express the​ y-coordinate of P in terms of x.​ (Hint: Write an equation for the
Pre-calc
A rectangle is inscribed with it's base on the x-axis and it's upper corners on the parabola y=4-x^2. What are the dimensions of such a rectangle with the greatest possible area? Width= Height=
You can view more similar questions or ask a new question.
Ask a New Question
© 2021 Jiskha Homework Help
About Us Contact Us Privacy Policy Terms of Use