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A circular plate of uniform thickness has a diameter of 56 . A circular portion of diameter 42 cm . is removed from +ve x edge of the plate. Find the position of center of mass of the remaining portion with respect to center of mass of whole plate

-7 cm
-9 cm
+9 cm
+7 cm

The correct answer is: -9 cm

If f(x) = $x tan to the power of negative 1 end exponent$ x then $lim for x not stretchy rightwards arrow 1 of fraction numerator f left parenthesis x right parenthesis minus f left parenthesis 1 right parenthesis over denominator x minus 1 end fraction equals$

maths-General

General

physics-

From a uniform circular disc of radius R, a circular disc of radius R/6 and having center at a distance +R/2 from the ceater of the disc is removed. Determine the center of mass of remaining portion of the disc.

physics-General

General

maths-

$L subscript n not stretchy rightwards arrow straight infinity end subscript L t open square brackets 1 over n squared sec squared space 1 over n squared plus 2 over n squared sec squared space 4 over n squared plus midline horizontal ellipsis times plus 1 over n sec squared space 1 close square brackets equals$

maths-General

General

physics-

Four particles A,B,C and D of masses m,2 m,3 m and 5 m respectively are placed at corners of a square of side x as shown in figure find the coordinate of center of mass take A. at origin of x-y plane

physics-General

General

maths-

$stack L t with n not stretchy rightwards arrow straight infinity below fraction numerator 1 plus 2 to the power of 4 plus 3 to the power of 4 plus midline horizontal ellipsis plus n to the power of 4 over denominator n to the power of 5 end fraction minus L t fraction numerator 1 plus 2 cubed plus 3 cubed plus.. plus n cubed over denominator n to the power of 4 end fraction equals$

maths-General

General

maths-

If $f left parenthesis x plus y right parenthesis equals f left parenthesis x right parenthesis f left parenthesis y right parenthesis plus x comma y$ and $f left parenthesis 5 right parenthesis equals 2 comma f to the power of straight prime left parenthesis 0 right parenthesis equals 3$

maths-General

General

physics-

Consider a two-particle system with the particles having masses M₁, and m₂. If the first particle is pushed towards the center of mass through a distance d, by what distance should the second particle be moved so as to keep the center of mass at the same position?

physics-General

General

Maths-

For $x element of R Lt subscript x not stretchy rightwards arrow straight infinity end subscript space open parentheses fraction numerator x minus 3 over denominator x plus 2 end fraction close parentheses to the power of x equals$

There are seven indeterminate forms which are typically considered in the literature
${\frac {0}{0}},~{\frac {\infty }{\infty }},~0\times \infty ,~\infty -\infty ,~0^{0},~1^{\infty },{\text{ and }}\infty ^{0}.$ :

For $x element of R Lt subscript x not stretchy rightwards arrow straight infinity end subscript space open parentheses fraction numerator x minus 3 over denominator x plus 2 end fraction close parentheses to the power of x equals$

Maths-General

General

physics-

Three particles of the same mass lie in the (X,Y) plane, The (X,Y) coordinates of their positions are (1,1),(2,2) and (3,3) respectively. The (X,Y) coordinates of the center of mass are

physics-General

General

Maths-

$Lt subscript h not stretchy rightwards arrow 0 end subscript space fraction numerator f open parentheses 2 h plus 2 plus h squared close parentheses minus f left parenthesis 2 right parenthesis over denominator f open parentheses h minus h squared plus 1 close parentheses minus f left parenthesis 1 right parenthesis end fraction$ given that $f to the power of † left parenthesis 2 right parenthesis equals 6 text and end text f to the power of † left parenthesis 1 right parenthesis equals 4$

We can only apply the L’Hospital’s rule if the direct substitution returns an indeterminate form, that means 0 over 0 or $fraction numerator plus-or-minus infinity over denominator plus-or-minus infinity end fraction.$

$Lt subscript h not stretchy rightwards arrow 0 end subscript space fraction numerator f open parentheses 2 h plus 2 plus h squared close parentheses minus f left parenthesis 2 right parenthesis over denominator f open parentheses h minus h squared plus 1 close parentheses minus f left parenthesis 1 right parenthesis end fraction$ given that $f to the power of † left parenthesis 2 right parenthesis equals 6 text and end text f to the power of † left parenthesis 1 right parenthesis equals 4$

Maths-General

General

Maths-

$Lim subscript x not stretchy rightwards arrow 0 end subscript space fraction numerator x tan space 2 x minus 2 x tan space x over denominator left parenthesis 1 minus cos space 2 x right parenthesis squared end fraction equals$

Maths-General

General

Maths-

If $f left parenthesis a right parenthesis equals 2 comma f to the power of straight prime left parenthesis a right parenthesis equals 1 comma g left parenthesis a right parenthesis equals negative 1 comma g to the power of factorial left parenthesis a right parenthesis equals 2$ , then the value of $Lim subscript x not stretchy rightwards arrow a end subscript space fraction numerator g left parenthesis x right parenthesis f left parenthesis a right parenthesis minus g left parenthesis a right parenthesis f left parenthesis x right parenthesis over denominator x minus a end fraction$ is

Maths-General

General

physics-

Particles of 1gm,1gm,2gm,2gm are placed at the comers A,B,C,D, respectively of a square of side $6 text end text c m$ as shown in figure. Find the distance of centre of mass of the system from geometrical center of square.

physics-General

General

Maths-

If $G left parenthesis x right parenthesis equals negative square root of 25 minus x squared end root$ then $Lim subscript x not stretchy rightwards arrow 1 end subscript space fraction numerator G left parenthesis x right parenthesis minus G left parenthesis 1 right parenthesis over denominator x minus 1 end fraction$ has the value

Maths-General

General

maths-

If $f left parenthesis x right parenthesis equals square root of fraction numerator x minus sin space x over denominator x plus cos space x end fraction end root$ then $L t f left parenthesis x right parenthesis$ is

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A circular plate of uniform thickness has a diameter of 56 . A circular portion of diameter 42 cm . is removed from +ve x edge of the plate. Find the position of center of mass of the remaining portion with respect to center of mass of whole plate

-7 cm
-9 cm
+9 cm
+7 cm

The correct answer is: -9 cm

Related Questions to study

If f(x) = $x tan to the power of negative 1 end exponent$ x then $lim for x not stretchy rightwards arrow 1 of fraction numerator f left parenthesis x right parenthesis minus f left parenthesis 1 right parenthesis over denominator x minus 1 end fraction equals$

If f(x) = $x tan to the power of negative 1 end exponent$ x then $lim for x not stretchy rightwards arrow 1 of fraction numerator f left parenthesis x right parenthesis minus f left parenthesis 1 right parenthesis over denominator x minus 1 end fraction equals$

From a uniform circular disc of radius R, a circular disc of radius R/6 and having center at a distance +R/2 from the ceater of the disc is removed. Determine the center of mass of remaining portion of the disc.

From a uniform circular disc of radius R, a circular disc of radius R/6 and having center at a distance +R/2 from the ceater of the disc is removed. Determine the center of mass of remaining portion of the disc.

Four particles A,B,C and D of masses m,2 m,3 m and 5 m respectively are placed at corners of a square of side x as shown in figure find the coordinate of center of mass take A. at origin of x-y plane

Four particles A,B,C and D of masses m,2 m,3 m and 5 m respectively are placed at corners of a square of side x as shown in figure find the coordinate of center of mass take A. at origin of x-y plane

If $f left parenthesis x plus y right parenthesis equals f left parenthesis x right parenthesis f left parenthesis y right parenthesis plus x comma y$ and $f left parenthesis 5 right parenthesis equals 2 comma f to the power of straight prime left parenthesis 0 right parenthesis equals 3$

If $f left parenthesis x plus y right parenthesis equals f left parenthesis x right parenthesis f left parenthesis y right parenthesis plus x comma y$ and $f left parenthesis 5 right parenthesis equals 2 comma f to the power of straight prime left parenthesis 0 right parenthesis equals 3$

Consider a two-particle system with the particles having masses M₁, and m₂. If the first particle is pushed towards the center of mass through a distance d, by what distance should the second particle be moved so as to keep the center of mass at the same position?

Consider a two-particle system with the particles having masses M₁, and m₂. If the first particle is pushed towards the center of mass through a distance d, by what distance should the second particle be moved so as to keep the center of mass at the same position?

For $x element of R Lt subscript x not stretchy rightwards arrow straight infinity end subscript space open parentheses fraction numerator x minus 3 over denominator x plus 2 end fraction close parentheses to the power of x equals$

For $x element of R Lt subscript x not stretchy rightwards arrow straight infinity end subscript space open parentheses fraction numerator x minus 3 over denominator x plus 2 end fraction close parentheses to the power of x equals$

Three particles of the same mass lie in the (X,Y) plane, The (X,Y) coordinates of their positions are (1,1),(2,2) and (3,3) respectively. The (X,Y) coordinates of the center of mass are

Three particles of the same mass lie in the (X,Y) plane, The (X,Y) coordinates of their positions are (1,1),(2,2) and (3,3) respectively. The (X,Y) coordinates of the center of mass are

$Lim subscript x not stretchy rightwards arrow 0 end subscript space fraction numerator x tan space 2 x minus 2 x tan space x over denominator left parenthesis 1 minus cos space 2 x right parenthesis squared end fraction equals$

$Lim subscript x not stretchy rightwards arrow 0 end subscript space fraction numerator x tan space 2 x minus 2 x tan space x over denominator left parenthesis 1 minus cos space 2 x right parenthesis squared end fraction equals$

Particles of 1gm,1gm,2gm,2gm are placed at the comers A,B,C,D, respectively of a square of side $6 text end text c m$ as shown in figure. Find the distance of centre of mass of the system from geometrical center of square.

Particles of 1gm,1gm,2gm,2gm are placed at the comers A,B,C,D, respectively of a square of side $6 text end text c m$ as shown in figure. Find the distance of centre of mass of the system from geometrical center of square.

If $f left parenthesis x right parenthesis equals square root of fraction numerator x minus sin space x over denominator x plus cos space x end fraction end root$ then $L t f left parenthesis x right parenthesis$ is

If $f left parenthesis x right parenthesis equals square root of fraction numerator x minus sin space x over denominator x plus cos space x end fraction end root$ then $L t f left parenthesis x right parenthesis$ is

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A circular plate of uniform thickness has a diameter of 56 . A circular portion of diameter 42 cm . is removed from +ve x edge of the plate. Find the position of center of mass of the remaining portion with respect to center of mass of whole plate

-7 cm-9 cm+9 cm+7 cm

The correct answer is: -9 cm

Related Questions to study

If f(x) = x then

If f(x) = x then

From a uniform circular disc of radius R, a circular disc of radius R/6 and having center at a distance +R/2 from the ceater of the disc is removed. Determine the center of mass of remaining portion of the disc.

From a uniform circular disc of radius R, a circular disc of radius R/6 and having center at a distance +R/2 from the ceater of the disc is removed. Determine the center of mass of remaining portion of the disc.

Four particles A,B,C and D of masses m,2 m,3 m and 5 m respectively are placed at corners of a square of side x as shown in figure find the coordinate of center of mass take A. at origin of x-y plane

Four particles A,B,C and D of masses m,2 m,3 m and 5 m respectively are placed at corners of a square of side x as shown in figure find the coordinate of center of mass take A. at origin of x-y plane

If and

If and

Consider a two-particle system with the particles having masses M1, and m2. If the first particle is pushed towards the center of mass through a distance d, by what distance should the second particle be moved so as to keep the center of mass at the same position?

Consider a two-particle system with the particles having masses M1, and m2. If the first particle is pushed towards the center of mass through a distance d, by what distance should the second particle be moved so as to keep the center of mass at the same position?

For

For

Three particles of the same mass lie in the (X,Y) plane, The (X,Y) coordinates of their positions are (1,1),(2,2) and (3,3) respectively. The (X,Y) coordinates of the center of mass are

Three particles of the same mass lie in the (X,Y) plane, The (X,Y) coordinates of their positions are (1,1),(2,2) and (3,3) respectively. The (X,Y) coordinates of the center of mass are

given that

given that

If , then the value of is

If , then the value of is

Particles of 1gm,1gm,2gm,2gm are placed at the comers A,B,C,D, respectively of a square of side as shown in figure. Find the distance of centre of mass of the system from geometrical center of square.

Particles of 1gm,1gm,2gm,2gm are placed at the comers A,B,C,D, respectively of a square of side as shown in figure. Find the distance of centre of mass of the system from geometrical center of square.

If then has the value

If then has the value

If then is

If then is

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-7 cm
-9 cm
+9 cm
+7 cm

If f(x) = $x tan to the power of negative 1 end exponent$ x then $lim for x not stretchy rightwards arrow 1 of fraction numerator f left parenthesis x right parenthesis minus f left parenthesis 1 right parenthesis over denominator x minus 1 end fraction equals$

If f(x) = $x tan to the power of negative 1 end exponent$ x then $lim for x not stretchy rightwards arrow 1 of fraction numerator f left parenthesis x right parenthesis minus f left parenthesis 1 right parenthesis over denominator x minus 1 end fraction equals$

If $f left parenthesis x plus y right parenthesis equals f left parenthesis x right parenthesis f left parenthesis y right parenthesis plus x comma y$ and $f left parenthesis 5 right parenthesis equals 2 comma f to the power of straight prime left parenthesis 0 right parenthesis equals 3$

If $f left parenthesis x plus y right parenthesis equals f left parenthesis x right parenthesis f left parenthesis y right parenthesis plus x comma y$ and $f left parenthesis 5 right parenthesis equals 2 comma f to the power of straight prime left parenthesis 0 right parenthesis equals 3$

Consider a two-particle system with the particles having masses M₁, and m₂. If the first particle is pushed towards the center of mass through a distance d, by what distance should the second particle be moved so as to keep the center of mass at the same position?

Consider a two-particle system with the particles having masses M₁, and m₂. If the first particle is pushed towards the center of mass through a distance d, by what distance should the second particle be moved so as to keep the center of mass at the same position?

For $x element of R Lt subscript x not stretchy rightwards arrow straight infinity end subscript space open parentheses fraction numerator x minus 3 over denominator x plus 2 end fraction close parentheses to the power of x equals$

For $x element of R Lt subscript x not stretchy rightwards arrow straight infinity end subscript space open parentheses fraction numerator x minus 3 over denominator x plus 2 end fraction close parentheses to the power of x equals$

Particles of 1gm,1gm,2gm,2gm are placed at the comers A,B,C,D, respectively of a square of side $6 text end text c m$ as shown in figure. Find the distance of centre of mass of the system from geometrical center of square.

Particles of 1gm,1gm,2gm,2gm are placed at the comers A,B,C,D, respectively of a square of side $6 text end text c m$ as shown in figure. Find the distance of centre of mass of the system from geometrical center of square.

If $f left parenthesis x right parenthesis equals square root of fraction numerator x minus sin space x over denominator x plus cos space x end fraction end root$ then $L t f left parenthesis x right parenthesis$ is

If $f left parenthesis x right parenthesis equals square root of fraction numerator x minus sin space x over denominator x plus cos space x end fraction end root$ then $L t f left parenthesis x right parenthesis$ is