figure rhom is a rhombus. ro and hm are the diagonals of the rhombus, as well as angle bisectors of the…

figure rhom is a rhombus. ro and hm are the diagonals of the rhombus, as well as angle bisectors of the vertex angles, and they create four isosceles triangles: hom, mhr, rho, and omr. what is true about ∠msr? it must be acute. it must be a right angle. it must be equal to ∠mrh. it must be equal to ∠rms.

figure rhom is a rhombus. ro and hm are the diagonals of the rhombus, as well as angle bisectors of the vertex angles, and they create four isosceles triangles: hom, mhr, rho, and omr. what is true about ∠msr? it must be acute. it must be a right angle. it must be equal to ∠mrh. it must be equal to ∠rms.

Answer

Answer:

B. It must be a right angle.

Explanation:

Step1: Recall rhombus property

The diagonals of a rhombus are perpendicular to each other.

Step2: Identify the angle

$\angle MSR$ is the angle formed by the diagonals $\overline{RO}$ and $\overline{HM}$ of rhombus $RHOM$. So $\angle MSR = 90^{\circ}$, which means it is a right - angle.