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568
150
Among the following, the intensive property is (properties are)
568
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Related Questions
Three randomly chosen nonnegative integers
$x,yandz$
are found to satisfy the equation
$x+y+z=10.$
Then the probability that
$z$
is even, is:
$125 $
(b)
$21 $
(c)
$116 $
(d)
$5536 $
The value of
$∫_{0}4x_{3}{dx_{2}d_{2} (1−x_{2})_{5}}dxis$
Let
$S$
be the circle in the
$xy$
-plane defined by the equation
$x_{2}+y_{2}=4.$
(For Ques. No 15 and 16)Let
$P$
be a point on the circle
$S$
with both coordinates being positive. Let the tangent to
$S$
at
$P$
intersect the coordinate axes at the points
$M$
and
$N$
. Then, the mid-point of the line segment
$MN$
must lie on the curve
$(x+y)_{2}=3xy$
(b)
$x_{2/3}+y_{2/3}=2_{4/3}$
(c)
$x_{2}+y_{2}=2xy$
(d)
$x_{2}+y_{2}=x_{2}y_{2}$
A solution curve of the differential equation
$(x_{2}+xy+4x+2y+4)(dxdy )−y_{2}=0$
passes through the point
$(1,3)$
Then the solution curve is
A debate club consists of 6 girls and 4 boys. A team of 4 members is to be selected from this club including the selection of a captain (from among these 4 members) for the team. If the team has to include at most one boy, then the number of ways of selecting the team is
The area enclosed by the curves
$y=sinx+cosxandy=∣cosx−sinx∣$
over the interval
$[0,2π ]$
Let
$p,q$
be integers and let
$α,β$
be the roots of the equation,
$x_{2}−x−1=0,$
where
$α=β$
. For
$n=0,1,2,,leta_{n}=pα_{n}+qβ_{n}˙$
FACT : If
$aandb$
are rational number and
$a+b5 =0,thena=0=b˙$
If
$a_{4}=28,thenp+2q=$
7 (b) 21 (c) 14 (d) 12
For every twice differentiable function
$f:R→[−2,2]$
with
$(f(0))_{2}+(f_{prime}(0))_{2}=85$
, which of the following statement(s) is (are) TRUE?There exist
$r,s∈R$
where
$r<s$
, such that
$f$
is one-one on the open interval
$(r,s)$
(b) There exists
$x_{0}∈(−4,0)$
such that
$∣∣∣ f_{prime}(x_{0})∣∣∣ ≤1$
(c)
$(lim)_{x→∞}f(x)=1$
(d) There exists
$α∈(−4,4)$
such that
$f(α)+f(α)=0$
and
$f_{prime}(α)=0$
Related Questions
Three randomly chosen nonnegative integers
$x,yandz$
are found to satisfy the equation
$x+y+z=10.$
Then the probability that
$z$
is even, is:
$125 $
(b)
$21 $
(c)
$116 $
(d)
$5536 $
The value of
$∫_{0}4x_{3}{dx_{2}d_{2} (1−x_{2})_{5}}dxis$
Let
$S$
be the circle in the
$xy$
-plane defined by the equation
$x_{2}+y_{2}=4.$
(For Ques. No 15 and 16)Let
$P$
be a point on the circle
$S$
with both coordinates being positive. Let the tangent to
$S$
at
$P$
intersect the coordinate axes at the points
$M$
and
$N$
. Then, the mid-point of the line segment
$MN$
must lie on the curve
$(x+y)_{2}=3xy$
(b)
$x_{2/3}+y_{2/3}=2_{4/3}$
(c)
$x_{2}+y_{2}=2xy$
(d)
$x_{2}+y_{2}=x_{2}y_{2}$
A solution curve of the differential equation
$(x_{2}+xy+4x+2y+4)(dxdy )−y_{2}=0$
passes through the point
$(1,3)$
Then the solution curve is
A debate club consists of 6 girls and 4 boys. A team of 4 members is to be selected from this club including the selection of a captain (from among these 4 members) for the team. If the team has to include at most one boy, then the number of ways of selecting the team is
The area enclosed by the curves
$y=sinx+cosxandy=∣cosx−sinx∣$
over the interval
$[0,2π ]$
Let
$p,q$
be integers and let
$α,β$
be the roots of the equation,
$x_{2}−x−1=0,$
where
$α=β$
. For
$n=0,1,2,,leta_{n}=pα_{n}+qβ_{n}˙$
FACT : If
$aandb$
are rational number and
$a+b5 =0,thena=0=b˙$
If
$a_{4}=28,thenp+2q=$
7 (b) 21 (c) 14 (d) 12
For every twice differentiable function
$f:R→[−2,2]$
with
$(f(0))_{2}+(f_{prime}(0))_{2}=85$
, which of the following statement(s) is (are) TRUE?There exist
$r,s∈R$
where
$r<s$
, such that
$f$
is one-one on the open interval
$(r,s)$
(b) There exists
$x_{0}∈(−4,0)$
such that
$∣∣∣ f_{prime}(x_{0})∣∣∣ ≤1$
(c)
$(lim)_{x→∞}f(x)=1$
(d) There exists
$α∈(−4,4)$
such that
$f(α)+f(α)=0$
and
$f_{prime}(α)=0$
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