Given -
Two Similar Prism with
H1 = 35 mm
H2 = 30 mm
To Find -
The ratio of volume of Prism =?
Step-by-Step Explanation -
We know the formula for the volume of Prism = B × H
Where
B = Base Area pf Prism
H = Height of the prism
Since we have given two similar prisms that means their base area are same.
So,
The ratio of volume of Prism = B×H1/B×H2
= H1/H2
= 35/30
= 7/6
Final Answer -
The ratio of volume of Prism = 7/6
Blank 1 = 7
Blank 2 = 6
Answer:
Correct arrangement of equation of displacement to find a is as follows;
1- Vt - d = 1/2 a t^2 (^ represents exponent i.e. t square as given in equation)
2- 2(Vt - d ) = a t^2
3- a = 2(Vt - d )/ t^2 (keep in mind, 2(Vt - d) whole divided by t^2)
Step-by-step explanation:
1- In the first equation, Vt is taken to the left side of the equation (keep in mind, original equation of displacement used for reference as given in question) and multiplied by -1 on the both sides of the equation.
2- In the second equation, 2 is multiplied on the both sides.
3- Multiply t^2 on both sides of the equation, We will get a in correct arrangement, which is required to find.
Answer:
one-solution
Step-by-step explanation:
(x + 2y = 6)2
2x - 3y = 26
2x + 4y = 12
2x - 3y = 26
7y = -14
y = -2
x + 2(-2) = 6
x + -4 = 6
x = 10
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I would assume not. Is this related to school or no? I'm a little lost here lol