Step-by-step explanation:
The given equation is : 3x-2(x+3)=4(x-2)-73x−2(x+3)=4(x−2)−7
On solving this equation and applying the distributive property, we have
⇒3x-2x-6=4x-8-73x−2x−6=4x−8−7
⇒x-6=4x-15x−6=4x−15
Combining the like terms like terms consisting of x are solved together and the constants are solved together,
⇒x-4x=-15+6x−4x=−15+6
⇒-3x=-9−3x=−9
⇒x=3x=3
To find the area of the given traingle we have to draw perpendicular from point 'J' which meets the x axis at point (2,0) and let us named it 'P'.
As we know that area of triangle is
[tex] = \frac{1}{2}\times b \times h [\tex]
Here base 'b' will be LK and height 'h' will be JP
Here,
LK= 4 units JP=4 units
Area ={1}{2} *(4)*(4)
On solving the equation we get,
Area=8 Sq units
We know, Volume of a Cylinder = πr²h
Here, r = 2/2 = 1 ft
h = 3 ft
Substitute their values,
v = 3.14 * (1)² * 3
v = 9.42 ft³
In short, Your Answer would be: 9.42 Ft³
Hope this helps!
Answer:
<h2>9</h2>
Step-by-step explanation:
If Point H is on line segment GI, then GH+HI = GI
Given the following parameters
GH = x + 6,
HI = x + 5, and
GI = 3x + 8
To determine the length of GH, we need to get the value of x first. To get x we will substitute the given parameters into the formula as shown;
x+6+(x+5) = 3x+8
2x+11 = 3x+8
collect like terms;
2x-3x = 8-11
-x = -3
divide both sides by -1;
-x/-1 = -3/-1
x = 3
Since GH = x+6
GH = 3+6
GH = 9
<em>Hence the numerical length of GH is 9</em>
...............the answer is D
