Respuesta :
Answer:
A) c₁ = m, c₂ = m/s
B) c₁ = m/s²
C) c₁ = m/s²
D) c₁ = m/s c₂ = °
E) c₁ = m/s , c₂ = /s
Explanation:
A) x = c₁ + c₂t
⇒m = m + (m/s)s (Only same units can be added)
⇒m = m
So, c₁ = m, c₂ = m/s
B) x = 0.5c₁t²
⇒m = 0.5 (m/s²)s²
⇒m = m
So, c₁ = m/s²
C) v² = 2c₁x
⇒m²/s² = 2 (m/s²)m
⇒m²/s² = m²/s²
So, c₁ = m/s²
D) x = c₁ cos(c₂)t
⇒m = (m/s) cos(°)s
⇒m = m
So, c₁ = m/s c₂ = °
E) v² = 2c₁v-(c₂x)²
⇒m²/s² = 2(m/s)(m/s)-(1/s²)(m²)
⇒m²/s² =m²/s²
So, c₁ = m/s , c₂ = /s
Explanation:
Given that,
The distance x is in meters.
The time t is in seconds.
The velocity v is in meter/ second.
We need to calculate the SI units the constants c₁ and c₂
(A). [tex]x =c_{1}+c_{2}t[/tex]
Put the unit in to the equation
[tex]m= m+m/s\times s[/tex]
Here, [tex]c_{1}=m[/tex]
[tex]c_{2}=m/s[/tex]
So,
[tex]m = m[/tex]
(B). [tex]x=0.5c_{1}t^2[/tex]
Put the unit in to the equation
[tex]m=0.5\times m/s^2\times s^2[/tex]
Here, [tex]c_{1}=m/s^2[/tex]
So, [tex]m=0.5 m[/tex]
(C). [tex]v^2=2c_{1}x[/tex]
Put the unit in to the equation
[tex]m^2/s^2=2\times m/s^2\times m[/tex]
Here, [tex]c_{1}=m/s^2[/tex]
So, [tex]m^2/s^2=2m^2/s^2[/tex]
(D). [tex]x=c_{1}\cos c_{2}t[/tex]
Put the unit in to the equation
[tex]m=m\times\cos(\dfrac{1}{s}\times s)[/tex]
Here, [tex]c_{1} =m[/tex]
[tex]c_{2}=\dfrac{1}{s}[/tex]
[tex]\cos(c_{2}t)[/tex] =dimension less
So, [tex]m=m[/tex]
(E). [tex]v^2=2c_{1}v-(c_{2}x)^2[/tex]
Put the unit in to the equation
[tex]m^2/s^2=2\times m/s\times m/s-(\dfrac{1}{s^2}\times m^2)[/tex]
Here, [tex]c_{1}=m/s[/tex]
[tex]c_{2}=\dfrac{1}{s}[/tex]
So, [tex]m^2/s^2=m^2/s^2[/tex]
Hence, This is the required solution.
